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@@ -76,7 +76,7 @@ __kernel void search(const uint state0, const uint state1, const uint state2, co
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__global uint * output)
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{
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u W[24];
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- //u Vals[8]; Now put at W[16] to be in same array
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+ u *Vals = &W[16]; // Now put at W[16] to be in same array
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#ifdef VECTORS4
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const u nonce = base + (uint)(get_local_id(0)) * 4u + (uint)(get_group_id(0)) * (WORKSIZE * 4u);
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@@ -86,1209 +86,1209 @@ __kernel void search(const uint state0, const uint state1, const uint state2, co
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const u nonce = base + get_local_id(0) + get_group_id(0) * (WORKSIZE);
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#endif
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-W[20]=fcty_e;
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-W[20]+=nonce;
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-
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-W[16]=W[20];
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-W[16]+=state0;
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-
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-W[19]=(rotr(W[16],6)^rotr(W[16],11)^rotr(W[16],25));
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-W[19]+=d1;
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-W[19]+=ch(W[16],b1,c1);
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-W[19]+=0xB956C25B;
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-
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-W[23]=W[19];
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-W[23]+=h1;
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-W[20]+=fcty_e2;
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-W[19]+=(rotr(W[20],2)^rotr(W[20],13)^rotr(W[20],22));
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-
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-W[18]=c1;
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-W[18]+=(rotr(W[23],6)^rotr(W[23],11)^rotr(W[23],25));
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-W[18]+=ch(W[23],W[16],b1);
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-W[18]+=K[5];
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-
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-W[22]=W[18];
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-W[22]+=g1;
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-W[19]+=Ma2(g1,W[20],f1);
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-W[18]+=(rotr(W[19],2)^rotr(W[19],13)^rotr(W[19],22));
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-
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-W[17]=b1;
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-W[17]+=(rotr(W[22],6)^rotr(W[22],11)^rotr(W[22],25));
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-W[17]+=ch(W[22],W[23],W[16]);
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-W[17]+=K[6];
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-
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-W[21]=W[17];
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-W[21]+=f1;
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-W[18]+=Ma2(f1,W[19],W[20]);
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-W[17]+=(rotr(W[18],2)^rotr(W[18],13)^rotr(W[18],22));
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-W[16]+=(rotr(W[21],6)^rotr(W[21],11)^rotr(W[21],25));
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-W[16]+=ch(W[21],W[22],W[23]);
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-W[16]+=K[7];
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-W[17]+=Ma(W[20],W[18],W[19]);
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-W[20]+=W[16];
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-W[16]+=(rotr(W[17],2)^rotr(W[17],13)^rotr(W[17],22));
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-W[16]+=Ma(W[19],W[17],W[18]);
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-W[23]+=(rotr(W[20],6)^rotr(W[20],11)^rotr(W[20],25));
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-W[23]+=ch(W[20],W[21],W[22]);
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-W[23]+=K[8];
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-W[19]+=W[23];
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-W[23]+=(rotr(W[16],2)^rotr(W[16],13)^rotr(W[16],22));
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-W[23]+=Ma(W[18],W[16],W[17]);
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-W[22]+=(rotr(W[19],6)^rotr(W[19],11)^rotr(W[19],25));
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-W[22]+=ch(W[19],W[20],W[21]);
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-W[22]+=K[9];
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-W[18]+=W[22];
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-W[22]+=(rotr(W[23],2)^rotr(W[23],13)^rotr(W[23],22));
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-W[22]+=Ma(W[17],W[23],W[16]);
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-W[21]+=(rotr(W[18],6)^rotr(W[18],11)^rotr(W[18],25));
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-W[21]+=ch(W[18],W[19],W[20]);
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-W[21]+=K[10];
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-W[17]+=W[21];
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-W[21]+=(rotr(W[22],2)^rotr(W[22],13)^rotr(W[22],22));
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-W[21]+=Ma(W[16],W[22],W[23]);
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-W[20]+=(rotr(W[17],6)^rotr(W[17],11)^rotr(W[17],25));
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-W[20]+=ch(W[17],W[18],W[19]);
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-W[20]+=K[11];
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-W[16]+=W[20];
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-W[20]+=(rotr(W[21],2)^rotr(W[21],13)^rotr(W[21],22));
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-W[20]+=Ma(W[23],W[21],W[22]);
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-W[19]+=(rotr(W[16],6)^rotr(W[16],11)^rotr(W[16],25));
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-W[19]+=ch(W[16],W[17],W[18]);
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-W[19]+=K[12];
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-W[23]+=W[19];
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-W[19]+=(rotr(W[20],2)^rotr(W[20],13)^rotr(W[20],22));
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-W[19]+=Ma(W[22],W[20],W[21]);
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-W[18]+=(rotr(W[23],6)^rotr(W[23],11)^rotr(W[23],25));
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-W[18]+=ch(W[23],W[16],W[17]);
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-W[18]+=K[13];
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-W[22]+=W[18];
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-W[18]+=(rotr(W[19],2)^rotr(W[19],13)^rotr(W[19],22));
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-W[18]+=Ma(W[21],W[19],W[20]);
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-W[17]+=(rotr(W[22],6)^rotr(W[22],11)^rotr(W[22],25));
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-W[17]+=ch(W[22],W[23],W[16]);
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-W[17]+=K[14];
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-W[21]+=W[17];
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-W[17]+=(rotr(W[18],2)^rotr(W[18],13)^rotr(W[18],22));
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-W[17]+=Ma(W[20],W[18],W[19]);
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-W[16]+=(rotr(W[21],6)^rotr(W[21],11)^rotr(W[21],25));
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-W[16]+=ch(W[21],W[22],W[23]);
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-W[16]+=0xC19BF3F4;
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-W[20]+=W[16];
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-W[16]+=(rotr(W[17],2)^rotr(W[17],13)^rotr(W[17],22));
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-W[23]+=(rotr(W[20],6)^rotr(W[20],11)^rotr(W[20],25));
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-W[23]+=ch(W[20],W[21],W[22]);
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-W[23]+=K[16];
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-W[23]+=fw0;
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-W[16]+=Ma(W[19],W[17],W[18]);
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-W[19]+=W[23];
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-W[23]+=(rotr(W[16],2)^rotr(W[16],13)^rotr(W[16],22));
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-W[23]+=Ma(W[18],W[16],W[17]);
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-W[22]+=(rotr(W[19],6)^rotr(W[19],11)^rotr(W[19],25));
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-W[22]+=ch(W[19],W[20],W[21]);
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-W[22]+=K[17];
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-W[22]+=fw1;
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-W[18]+=W[22];
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-W[22]+=(rotr(W[23],2)^rotr(W[23],13)^rotr(W[23],22));
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+Vals[4]=fcty_e;
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+Vals[4]+=nonce;
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+
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+Vals[0]=Vals[4];
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+Vals[0]+=state0;
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+
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+Vals[3]=(rotr(Vals[0],6)^rotr(Vals[0],11)^rotr(Vals[0],25));
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+Vals[3]+=d1;
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+Vals[3]+=ch(Vals[0],b1,c1);
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+Vals[3]+=0xB956C25B;
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+
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+Vals[7]=Vals[3];
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+Vals[7]+=h1;
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+Vals[4]+=fcty_e2;
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+Vals[3]+=(rotr(Vals[4],2)^rotr(Vals[4],13)^rotr(Vals[4],22));
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+
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+Vals[2]=c1;
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+Vals[2]+=(rotr(Vals[7],6)^rotr(Vals[7],11)^rotr(Vals[7],25));
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+Vals[2]+=ch(Vals[7],Vals[0],b1);
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+Vals[2]+=K[5];
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+
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+Vals[6]=Vals[2];
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+Vals[6]+=g1;
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+Vals[3]+=Ma2(g1,Vals[4],f1);
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+Vals[2]+=(rotr(Vals[3],2)^rotr(Vals[3],13)^rotr(Vals[3],22));
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+
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+Vals[1]=b1;
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+Vals[1]+=(rotr(Vals[6],6)^rotr(Vals[6],11)^rotr(Vals[6],25));
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+Vals[1]+=ch(Vals[6],Vals[7],Vals[0]);
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+Vals[1]+=K[6];
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+
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+Vals[5]=Vals[1];
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+Vals[5]+=f1;
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+Vals[2]+=Ma2(f1,Vals[3],Vals[4]);
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+Vals[1]+=(rotr(Vals[2],2)^rotr(Vals[2],13)^rotr(Vals[2],22));
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+Vals[0]+=(rotr(Vals[5],6)^rotr(Vals[5],11)^rotr(Vals[5],25));
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+Vals[0]+=ch(Vals[5],Vals[6],Vals[7]);
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+Vals[0]+=K[7];
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+Vals[1]+=Ma(Vals[4],Vals[2],Vals[3]);
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+Vals[4]+=Vals[0];
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+Vals[0]+=(rotr(Vals[1],2)^rotr(Vals[1],13)^rotr(Vals[1],22));
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+Vals[0]+=Ma(Vals[3],Vals[1],Vals[2]);
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+Vals[7]+=(rotr(Vals[4],6)^rotr(Vals[4],11)^rotr(Vals[4],25));
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+Vals[7]+=ch(Vals[4],Vals[5],Vals[6]);
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+Vals[7]+=K[8];
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+Vals[3]+=Vals[7];
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+Vals[7]+=(rotr(Vals[0],2)^rotr(Vals[0],13)^rotr(Vals[0],22));
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+Vals[7]+=Ma(Vals[2],Vals[0],Vals[1]);
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+Vals[6]+=(rotr(Vals[3],6)^rotr(Vals[3],11)^rotr(Vals[3],25));
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+Vals[6]+=ch(Vals[3],Vals[4],Vals[5]);
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+Vals[6]+=K[9];
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+Vals[2]+=Vals[6];
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+Vals[6]+=(rotr(Vals[7],2)^rotr(Vals[7],13)^rotr(Vals[7],22));
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+Vals[6]+=Ma(Vals[1],Vals[7],Vals[0]);
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+Vals[5]+=(rotr(Vals[2],6)^rotr(Vals[2],11)^rotr(Vals[2],25));
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+Vals[5]+=ch(Vals[2],Vals[3],Vals[4]);
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+Vals[5]+=K[10];
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+Vals[1]+=Vals[5];
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+Vals[5]+=(rotr(Vals[6],2)^rotr(Vals[6],13)^rotr(Vals[6],22));
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+Vals[5]+=Ma(Vals[0],Vals[6],Vals[7]);
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+Vals[4]+=(rotr(Vals[1],6)^rotr(Vals[1],11)^rotr(Vals[1],25));
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+Vals[4]+=ch(Vals[1],Vals[2],Vals[3]);
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+Vals[4]+=K[11];
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+Vals[0]+=Vals[4];
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+Vals[4]+=(rotr(Vals[5],2)^rotr(Vals[5],13)^rotr(Vals[5],22));
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+Vals[4]+=Ma(Vals[7],Vals[5],Vals[6]);
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+Vals[3]+=(rotr(Vals[0],6)^rotr(Vals[0],11)^rotr(Vals[0],25));
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+Vals[3]+=ch(Vals[0],Vals[1],Vals[2]);
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+Vals[3]+=K[12];
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+Vals[7]+=Vals[3];
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+Vals[3]+=(rotr(Vals[4],2)^rotr(Vals[4],13)^rotr(Vals[4],22));
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+Vals[3]+=Ma(Vals[6],Vals[4],Vals[5]);
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+Vals[2]+=(rotr(Vals[7],6)^rotr(Vals[7],11)^rotr(Vals[7],25));
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+Vals[2]+=ch(Vals[7],Vals[0],Vals[1]);
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+Vals[2]+=K[13];
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+Vals[6]+=Vals[2];
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+Vals[2]+=(rotr(Vals[3],2)^rotr(Vals[3],13)^rotr(Vals[3],22));
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+Vals[2]+=Ma(Vals[5],Vals[3],Vals[4]);
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+Vals[1]+=(rotr(Vals[6],6)^rotr(Vals[6],11)^rotr(Vals[6],25));
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+Vals[1]+=ch(Vals[6],Vals[7],Vals[0]);
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+Vals[1]+=K[14];
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+Vals[5]+=Vals[1];
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+Vals[1]+=(rotr(Vals[2],2)^rotr(Vals[2],13)^rotr(Vals[2],22));
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+Vals[1]+=Ma(Vals[4],Vals[2],Vals[3]);
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+Vals[0]+=(rotr(Vals[5],6)^rotr(Vals[5],11)^rotr(Vals[5],25));
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+Vals[0]+=ch(Vals[5],Vals[6],Vals[7]);
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+Vals[0]+=0xC19BF3F4;
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+Vals[4]+=Vals[0];
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+Vals[0]+=(rotr(Vals[1],2)^rotr(Vals[1],13)^rotr(Vals[1],22));
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+Vals[7]+=(rotr(Vals[4],6)^rotr(Vals[4],11)^rotr(Vals[4],25));
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+Vals[7]+=ch(Vals[4],Vals[5],Vals[6]);
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+Vals[7]+=K[16];
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+Vals[7]+=fw0;
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+Vals[0]+=Ma(Vals[3],Vals[1],Vals[2]);
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+Vals[3]+=Vals[7];
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+Vals[7]+=(rotr(Vals[0],2)^rotr(Vals[0],13)^rotr(Vals[0],22));
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+Vals[7]+=Ma(Vals[2],Vals[0],Vals[1]);
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+Vals[6]+=(rotr(Vals[3],6)^rotr(Vals[3],11)^rotr(Vals[3],25));
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+Vals[6]+=ch(Vals[3],Vals[4],Vals[5]);
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+Vals[6]+=K[17];
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+Vals[6]+=fw1;
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+Vals[2]+=Vals[6];
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+Vals[6]+=(rotr(Vals[7],2)^rotr(Vals[7],13)^rotr(Vals[7],22));
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W[2]=(rotr(nonce,7)^rotr(nonce,18)^(nonce>>3U));
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W[2]+=fw2;
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-W[21]+=W[2];
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-W[21]+=(rotr(W[18],6)^rotr(W[18],11)^rotr(W[18],25));
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-W[21]+=ch(W[18],W[19],W[20]);
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-W[21]+=K[18];
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-W[22]+=Ma(W[17],W[23],W[16]);
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-W[17]+=W[21];
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-W[21]+=(rotr(W[22],2)^rotr(W[22],13)^rotr(W[22],22));
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-W[21]+=Ma(W[16],W[22],W[23]);
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+Vals[5]+=W[2];
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+Vals[5]+=(rotr(Vals[2],6)^rotr(Vals[2],11)^rotr(Vals[2],25));
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+Vals[5]+=ch(Vals[2],Vals[3],Vals[4]);
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+Vals[5]+=K[18];
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+Vals[6]+=Ma(Vals[1],Vals[7],Vals[0]);
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+Vals[1]+=Vals[5];
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+Vals[5]+=(rotr(Vals[6],2)^rotr(Vals[6],13)^rotr(Vals[6],22));
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+Vals[5]+=Ma(Vals[0],Vals[6],Vals[7]);
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W[3]=nonce;
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W[3]+=fw3;
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-W[20]+=W[3];
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-W[20]+=(rotr(W[17],6)^rotr(W[17],11)^rotr(W[17],25));
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-W[20]+=ch(W[17],W[18],W[19]);
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-W[20]+=K[19];
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-W[16]+=W[20];
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-W[20]+=(rotr(W[21],2)^rotr(W[21],13)^rotr(W[21],22));
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+Vals[4]+=W[3];
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+Vals[4]+=(rotr(Vals[1],6)^rotr(Vals[1],11)^rotr(Vals[1],25));
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+Vals[4]+=ch(Vals[1],Vals[2],Vals[3]);
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+Vals[4]+=K[19];
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+Vals[0]+=Vals[4];
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+Vals[4]+=(rotr(Vals[5],2)^rotr(Vals[5],13)^rotr(Vals[5],22));
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W[4]=(rotr(W[2],17)^rotr(W[2],19)^(W[2]>>10U));
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W[4]+=0x80000000;
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-W[19]+=W[4];
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-W[19]+=(rotr(W[16],6)^rotr(W[16],11)^rotr(W[16],25));
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-W[19]+=ch(W[16],W[17],W[18]);
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-W[19]+=K[20];
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-W[20]+=Ma(W[23],W[21],W[22]);
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-W[23]+=W[19];
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-W[19]+=(rotr(W[20],2)^rotr(W[20],13)^rotr(W[20],22));
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-W[19]+=Ma(W[22],W[20],W[21]);
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+Vals[3]+=W[4];
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+Vals[3]+=(rotr(Vals[0],6)^rotr(Vals[0],11)^rotr(Vals[0],25));
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+Vals[3]+=ch(Vals[0],Vals[1],Vals[2]);
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+Vals[3]+=K[20];
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+Vals[4]+=Ma(Vals[7],Vals[5],Vals[6]);
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+Vals[7]+=Vals[3];
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+Vals[3]+=(rotr(Vals[4],2)^rotr(Vals[4],13)^rotr(Vals[4],22));
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+Vals[3]+=Ma(Vals[6],Vals[4],Vals[5]);
|
|
|
|
|
|
W[5]=(rotr(W[3],17)^rotr(W[3],19)^(W[3]>>10U));
|
|
|
-W[18]+=W[5];
|
|
|
-W[18]+=(rotr(W[23],6)^rotr(W[23],11)^rotr(W[23],25));
|
|
|
-W[18]+=ch(W[23],W[16],W[17]);
|
|
|
-W[18]+=K[21];
|
|
|
-W[22]+=W[18];
|
|
|
-W[18]+=(rotr(W[19],2)^rotr(W[19],13)^rotr(W[19],22));
|
|
|
+Vals[2]+=W[5];
|
|
|
+Vals[2]+=(rotr(Vals[7],6)^rotr(Vals[7],11)^rotr(Vals[7],25));
|
|
|
+Vals[2]+=ch(Vals[7],Vals[0],Vals[1]);
|
|
|
+Vals[2]+=K[21];
|
|
|
+Vals[6]+=Vals[2];
|
|
|
+Vals[2]+=(rotr(Vals[3],2)^rotr(Vals[3],13)^rotr(Vals[3],22));
|
|
|
|
|
|
W[6]=(rotr(W[4],17)^rotr(W[4],19)^(W[4]>>10U));
|
|
|
W[6]+=0x00000280U;
|
|
|
-W[17]+=W[6];
|
|
|
-W[17]+=(rotr(W[22],6)^rotr(W[22],11)^rotr(W[22],25));
|
|
|
-W[17]+=ch(W[22],W[23],W[16]);
|
|
|
-W[17]+=K[22];
|
|
|
-W[18]+=Ma(W[21],W[19],W[20]);
|
|
|
-W[21]+=W[17];
|
|
|
-W[17]+=(rotr(W[18],2)^rotr(W[18],13)^rotr(W[18],22));
|
|
|
-W[17]+=Ma(W[20],W[18],W[19]);
|
|
|
+Vals[1]+=W[6];
|
|
|
+Vals[1]+=(rotr(Vals[6],6)^rotr(Vals[6],11)^rotr(Vals[6],25));
|
|
|
+Vals[1]+=ch(Vals[6],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=K[22];
|
|
|
+Vals[2]+=Ma(Vals[5],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=Vals[1];
|
|
|
+Vals[1]+=(rotr(Vals[2],2)^rotr(Vals[2],13)^rotr(Vals[2],22));
|
|
|
+Vals[1]+=Ma(Vals[4],Vals[2],Vals[3]);
|
|
|
|
|
|
W[7]=(rotr(W[5],17)^rotr(W[5],19)^(W[5]>>10U));
|
|
|
W[7]+=fw0;
|
|
|
-W[16]+=W[7];
|
|
|
-W[16]+=(rotr(W[21],6)^rotr(W[21],11)^rotr(W[21],25));
|
|
|
-W[16]+=ch(W[21],W[22],W[23]);
|
|
|
-W[16]+=K[23];
|
|
|
+Vals[0]+=W[7];
|
|
|
+Vals[0]+=(rotr(Vals[5],6)^rotr(Vals[5],11)^rotr(Vals[5],25));
|
|
|
+Vals[0]+=ch(Vals[5],Vals[6],Vals[7]);
|
|
|
+Vals[0]+=K[23];
|
|
|
|
|
|
-W[20]+=W[16];
|
|
|
-W[16]+=(rotr(W[17],2)^rotr(W[17],13)^rotr(W[17],22));
|
|
|
+Vals[4]+=Vals[0];
|
|
|
+Vals[0]+=(rotr(Vals[1],2)^rotr(Vals[1],13)^rotr(Vals[1],22));
|
|
|
|
|
|
W[8]=(rotr(W[6],17)^rotr(W[6],19)^(W[6]>>10U));
|
|
|
W[8]+=fw1;
|
|
|
-W[23]+=W[8];
|
|
|
-W[23]+=(rotr(W[20],6)^rotr(W[20],11)^rotr(W[20],25));
|
|
|
-W[23]+=ch(W[20],W[21],W[22]);
|
|
|
-W[23]+=K[24];
|
|
|
-W[16]+=Ma(W[19],W[17],W[18]);
|
|
|
-W[19]+=W[23];
|
|
|
-W[23]+=(rotr(W[16],2)^rotr(W[16],13)^rotr(W[16],22));
|
|
|
-W[23]+=Ma(W[18],W[16],W[17]);
|
|
|
+Vals[7]+=W[8];
|
|
|
+Vals[7]+=(rotr(Vals[4],6)^rotr(Vals[4],11)^rotr(Vals[4],25));
|
|
|
+Vals[7]+=ch(Vals[4],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=K[24];
|
|
|
+Vals[0]+=Ma(Vals[3],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=Vals[7];
|
|
|
+Vals[7]+=(rotr(Vals[0],2)^rotr(Vals[0],13)^rotr(Vals[0],22));
|
|
|
+Vals[7]+=Ma(Vals[2],Vals[0],Vals[1]);
|
|
|
|
|
|
W[9]=W[2];
|
|
|
W[9]+=(rotr(W[7],17)^rotr(W[7],19)^(W[7]>>10U));
|
|
|
-W[22]+=W[9];
|
|
|
-W[22]+=(rotr(W[19],6)^rotr(W[19],11)^rotr(W[19],25));
|
|
|
-W[22]+=ch(W[19],W[20],W[21]);
|
|
|
-W[22]+=K[25];
|
|
|
+Vals[6]+=W[9];
|
|
|
+Vals[6]+=(rotr(Vals[3],6)^rotr(Vals[3],11)^rotr(Vals[3],25));
|
|
|
+Vals[6]+=ch(Vals[3],Vals[4],Vals[5]);
|
|
|
+Vals[6]+=K[25];
|
|
|
|
|
|
-W[18]+=W[22];
|
|
|
-W[22]+=(rotr(W[23],2)^rotr(W[23],13)^rotr(W[23],22));
|
|
|
+Vals[2]+=Vals[6];
|
|
|
+Vals[6]+=(rotr(Vals[7],2)^rotr(Vals[7],13)^rotr(Vals[7],22));
|
|
|
|
|
|
W[10]=W[3];
|
|
|
W[10]+=(rotr(W[8],17)^rotr(W[8],19)^(W[8]>>10U));
|
|
|
-W[21]+=W[10];
|
|
|
-W[21]+=(rotr(W[18],6)^rotr(W[18],11)^rotr(W[18],25));
|
|
|
-W[21]+=ch(W[18],W[19],W[20]);
|
|
|
-W[21]+=K[26];
|
|
|
-W[22]+=Ma(W[17],W[23],W[16]);
|
|
|
-W[17]+=W[21];
|
|
|
-W[21]+=(rotr(W[22],2)^rotr(W[22],13)^rotr(W[22],22));
|
|
|
-W[21]+=Ma(W[16],W[22],W[23]);
|
|
|
+Vals[5]+=W[10];
|
|
|
+Vals[5]+=(rotr(Vals[2],6)^rotr(Vals[2],11)^rotr(Vals[2],25));
|
|
|
+Vals[5]+=ch(Vals[2],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=K[26];
|
|
|
+Vals[6]+=Ma(Vals[1],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=Vals[5];
|
|
|
+Vals[5]+=(rotr(Vals[6],2)^rotr(Vals[6],13)^rotr(Vals[6],22));
|
|
|
+Vals[5]+=Ma(Vals[0],Vals[6],Vals[7]);
|
|
|
|
|
|
W[11]=W[4];
|
|
|
W[11]+=(rotr(W[9],17)^rotr(W[9],19)^(W[9]>>10U));
|
|
|
-W[20]+=W[11];
|
|
|
-W[20]+=(rotr(W[17],6)^rotr(W[17],11)^rotr(W[17],25));
|
|
|
-W[20]+=ch(W[17],W[18],W[19]);
|
|
|
-W[20]+=K[27];
|
|
|
-W[16]+=W[20];
|
|
|
-W[20]+=(rotr(W[21],2)^rotr(W[21],13)^rotr(W[21],22));
|
|
|
+Vals[4]+=W[11];
|
|
|
+Vals[4]+=(rotr(Vals[1],6)^rotr(Vals[1],11)^rotr(Vals[1],25));
|
|
|
+Vals[4]+=ch(Vals[1],Vals[2],Vals[3]);
|
|
|
+Vals[4]+=K[27];
|
|
|
+Vals[0]+=Vals[4];
|
|
|
+Vals[4]+=(rotr(Vals[5],2)^rotr(Vals[5],13)^rotr(Vals[5],22));
|
|
|
|
|
|
W[12]=W[5];
|
|
|
W[12]+=(rotr(W[10],17)^rotr(W[10],19)^(W[10]>>10U));
|
|
|
-W[19]+=W[12];
|
|
|
-W[19]+=(rotr(W[16],6)^rotr(W[16],11)^rotr(W[16],25));
|
|
|
-W[19]+=ch(W[16],W[17],W[18]);
|
|
|
-W[19]+=K[28];
|
|
|
-W[20]+=Ma(W[23],W[21],W[22]);
|
|
|
-W[23]+=W[19];
|
|
|
-W[19]+=(rotr(W[20],2)^rotr(W[20],13)^rotr(W[20],22));
|
|
|
-W[19]+=Ma(W[22],W[20],W[21]);
|
|
|
+Vals[3]+=W[12];
|
|
|
+Vals[3]+=(rotr(Vals[0],6)^rotr(Vals[0],11)^rotr(Vals[0],25));
|
|
|
+Vals[3]+=ch(Vals[0],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=K[28];
|
|
|
+Vals[4]+=Ma(Vals[7],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=Vals[3];
|
|
|
+Vals[3]+=(rotr(Vals[4],2)^rotr(Vals[4],13)^rotr(Vals[4],22));
|
|
|
+Vals[3]+=Ma(Vals[6],Vals[4],Vals[5]);
|
|
|
|
|
|
W[13]=W[6];
|
|
|
W[13]+=(rotr(W[11],17)^rotr(W[11],19)^(W[11]>>10U));
|
|
|
-W[18]+=W[13];
|
|
|
-W[18]+=(rotr(W[23],6)^rotr(W[23],11)^rotr(W[23],25));
|
|
|
-W[18]+=ch(W[23],W[16],W[17]);
|
|
|
-W[18]+=K[29];
|
|
|
-W[22]+=W[18];
|
|
|
-W[18]+=(rotr(W[19],2)^rotr(W[19],13)^rotr(W[19],22));
|
|
|
+Vals[2]+=W[13];
|
|
|
+Vals[2]+=(rotr(Vals[7],6)^rotr(Vals[7],11)^rotr(Vals[7],25));
|
|
|
+Vals[2]+=ch(Vals[7],Vals[0],Vals[1]);
|
|
|
+Vals[2]+=K[29];
|
|
|
+Vals[6]+=Vals[2];
|
|
|
+Vals[2]+=(rotr(Vals[3],2)^rotr(Vals[3],13)^rotr(Vals[3],22));
|
|
|
|
|
|
W[14]=0x00a00055U;
|
|
|
W[14]+=W[7];
|
|
|
W[14]+=(rotr(W[12],17)^rotr(W[12],19)^(W[12]>>10U));
|
|
|
-W[17]+=W[14];
|
|
|
-W[17]+=(rotr(W[22],6)^rotr(W[22],11)^rotr(W[22],25));
|
|
|
-W[17]+=ch(W[22],W[23],W[16]);
|
|
|
-W[17]+=K[30];
|
|
|
-W[18]+=Ma(W[21],W[19],W[20]);
|
|
|
-W[21]+=W[17];
|
|
|
-W[17]+=(rotr(W[18],2)^rotr(W[18],13)^rotr(W[18],22));
|
|
|
-W[17]+=Ma(W[20],W[18],W[19]);
|
|
|
+Vals[1]+=W[14];
|
|
|
+Vals[1]+=(rotr(Vals[6],6)^rotr(Vals[6],11)^rotr(Vals[6],25));
|
|
|
+Vals[1]+=ch(Vals[6],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=K[30];
|
|
|
+Vals[2]+=Ma(Vals[5],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=Vals[1];
|
|
|
+Vals[1]+=(rotr(Vals[2],2)^rotr(Vals[2],13)^rotr(Vals[2],22));
|
|
|
+Vals[1]+=Ma(Vals[4],Vals[2],Vals[3]);
|
|
|
|
|
|
W[15]=fw15;
|
|
|
W[15]+=W[8];
|
|
|
W[15]+=(rotr(W[13],17)^rotr(W[13],19)^(W[13]>>10U));
|
|
|
-W[16]+=W[15];
|
|
|
-W[16]+=(rotr(W[21],6)^rotr(W[21],11)^rotr(W[21],25));
|
|
|
-W[16]+=ch(W[21],W[22],W[23]);
|
|
|
-W[16]+=K[31];
|
|
|
-W[20]+=W[16];
|
|
|
-W[16]+=(rotr(W[17],2)^rotr(W[17],13)^rotr(W[17],22));
|
|
|
+Vals[0]+=W[15];
|
|
|
+Vals[0]+=(rotr(Vals[5],6)^rotr(Vals[5],11)^rotr(Vals[5],25));
|
|
|
+Vals[0]+=ch(Vals[5],Vals[6],Vals[7]);
|
|
|
+Vals[0]+=K[31];
|
|
|
+Vals[4]+=Vals[0];
|
|
|
+Vals[0]+=(rotr(Vals[1],2)^rotr(Vals[1],13)^rotr(Vals[1],22));
|
|
|
|
|
|
W[0]=fw01r;
|
|
|
W[0]+=W[9];
|
|
|
W[0]+=(rotr(W[14],17)^rotr(W[14],19)^(W[14]>>10U));
|
|
|
-W[23]+=W[0];
|
|
|
-W[23]+=(rotr(W[20],6)^rotr(W[20],11)^rotr(W[20],25));
|
|
|
-W[23]+=ch(W[20],W[21],W[22]);
|
|
|
-W[23]+=K[32];
|
|
|
-W[16]+=Ma(W[19],W[17],W[18]);
|
|
|
-W[19]+=W[23];
|
|
|
-W[23]+=(rotr(W[16],2)^rotr(W[16],13)^rotr(W[16],22));
|
|
|
-W[23]+=Ma(W[18],W[16],W[17]);
|
|
|
+Vals[7]+=W[0];
|
|
|
+Vals[7]+=(rotr(Vals[4],6)^rotr(Vals[4],11)^rotr(Vals[4],25));
|
|
|
+Vals[7]+=ch(Vals[4],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=K[32];
|
|
|
+Vals[0]+=Ma(Vals[3],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=Vals[7];
|
|
|
+Vals[7]+=(rotr(Vals[0],2)^rotr(Vals[0],13)^rotr(Vals[0],22));
|
|
|
+Vals[7]+=Ma(Vals[2],Vals[0],Vals[1]);
|
|
|
|
|
|
W[1]=fw1;
|
|
|
W[1]+=(rotr(W[2],7)^rotr(W[2],18)^(W[2]>>3U));
|
|
|
W[1]+=W[10];
|
|
|
W[1]+=(rotr(W[15],17)^rotr(W[15],19)^(W[15]>>10U));
|
|
|
-W[22]+=W[1];
|
|
|
-W[22]+=(rotr(W[19],6)^rotr(W[19],11)^rotr(W[19],25));
|
|
|
-W[22]+=ch(W[19],W[20],W[21]);
|
|
|
-W[22]+=K[33];
|
|
|
-W[18]+=W[22];
|
|
|
-W[22]+=(rotr(W[23],2)^rotr(W[23],13)^rotr(W[23],22));
|
|
|
+Vals[6]+=W[1];
|
|
|
+Vals[6]+=(rotr(Vals[3],6)^rotr(Vals[3],11)^rotr(Vals[3],25));
|
|
|
+Vals[6]+=ch(Vals[3],Vals[4],Vals[5]);
|
|
|
+Vals[6]+=K[33];
|
|
|
+Vals[2]+=Vals[6];
|
|
|
+Vals[6]+=(rotr(Vals[7],2)^rotr(Vals[7],13)^rotr(Vals[7],22));
|
|
|
W[2]+=(rotr(W[3],7)^rotr(W[3],18)^(W[3]>>3U));
|
|
|
W[2]+=W[11];
|
|
|
-W[21]+=(rotr(W[18],6)^rotr(W[18],11)^rotr(W[18],25));
|
|
|
-W[21]+=ch(W[18],W[19],W[20]);
|
|
|
+Vals[5]+=(rotr(Vals[2],6)^rotr(Vals[2],11)^rotr(Vals[2],25));
|
|
|
+Vals[5]+=ch(Vals[2],Vals[3],Vals[4]);
|
|
|
W[2]+=(rotr(W[0],17)^rotr(W[0],19)^(W[0]>>10U));
|
|
|
-W[21]+=K[34];
|
|
|
-W[21]+=W[2];
|
|
|
-W[22]+=Ma(W[17],W[23],W[16]);
|
|
|
-W[17]+=W[21];
|
|
|
-W[21]+=(rotr(W[22],2)^rotr(W[22],13)^rotr(W[22],22));
|
|
|
-W[21]+=Ma(W[16],W[22],W[23]);
|
|
|
+Vals[5]+=K[34];
|
|
|
+Vals[5]+=W[2];
|
|
|
+Vals[6]+=Ma(Vals[1],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=Vals[5];
|
|
|
+Vals[5]+=(rotr(Vals[6],2)^rotr(Vals[6],13)^rotr(Vals[6],22));
|
|
|
+Vals[5]+=Ma(Vals[0],Vals[6],Vals[7]);
|
|
|
W[3]+=(rotr(W[4],7)^rotr(W[4],18)^(W[4]>>3U));
|
|
|
W[3]+=W[12];
|
|
|
-W[20]+=(rotr(W[17],6)^rotr(W[17],11)^rotr(W[17],25));
|
|
|
-W[20]+=ch(W[17],W[18],W[19]);
|
|
|
-W[20]+=K[35];
|
|
|
+Vals[4]+=(rotr(Vals[1],6)^rotr(Vals[1],11)^rotr(Vals[1],25));
|
|
|
+Vals[4]+=ch(Vals[1],Vals[2],Vals[3]);
|
|
|
+Vals[4]+=K[35];
|
|
|
W[3]+=(rotr(W[1],17)^rotr(W[1],19)^(W[1]>>10U));
|
|
|
-W[20]+=W[3];
|
|
|
-W[16]+=W[20];
|
|
|
-W[20]+=(rotr(W[21],2)^rotr(W[21],13)^rotr(W[21],22));
|
|
|
+Vals[4]+=W[3];
|
|
|
+Vals[0]+=Vals[4];
|
|
|
+Vals[4]+=(rotr(Vals[5],2)^rotr(Vals[5],13)^rotr(Vals[5],22));
|
|
|
W[4]+=(rotr(W[5],7)^rotr(W[5],18)^(W[5]>>3U));
|
|
|
W[4]+=W[13];
|
|
|
-W[19]+=(rotr(W[16],6)^rotr(W[16],11)^rotr(W[16],25));
|
|
|
-W[19]+=ch(W[16],W[17],W[18]);
|
|
|
+Vals[3]+=(rotr(Vals[0],6)^rotr(Vals[0],11)^rotr(Vals[0],25));
|
|
|
+Vals[3]+=ch(Vals[0],Vals[1],Vals[2]);
|
|
|
W[4]+=(rotr(W[2],17)^rotr(W[2],19)^(W[2]>>10U));
|
|
|
-W[19]+=K[36];
|
|
|
-W[19]+=W[4];
|
|
|
-W[20]+=Ma(W[23],W[21],W[22]);
|
|
|
-W[23]+=W[19];
|
|
|
-W[19]+=(rotr(W[20],2)^rotr(W[20],13)^rotr(W[20],22));
|
|
|
-W[19]+=Ma(W[22],W[20],W[21]);
|
|
|
+Vals[3]+=K[36];
|
|
|
+Vals[3]+=W[4];
|
|
|
+Vals[4]+=Ma(Vals[7],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=Vals[3];
|
|
|
+Vals[3]+=(rotr(Vals[4],2)^rotr(Vals[4],13)^rotr(Vals[4],22));
|
|
|
+Vals[3]+=Ma(Vals[6],Vals[4],Vals[5]);
|
|
|
W[5]+=(rotr(W[6],7)^rotr(W[6],18)^(W[6]>>3U));
|
|
|
W[5]+=W[14];
|
|
|
-W[18]+=(rotr(W[23],6)^rotr(W[23],11)^rotr(W[23],25));
|
|
|
-W[18]+=ch(W[23],W[16],W[17]);
|
|
|
-W[18]+=K[37];
|
|
|
+Vals[2]+=(rotr(Vals[7],6)^rotr(Vals[7],11)^rotr(Vals[7],25));
|
|
|
+Vals[2]+=ch(Vals[7],Vals[0],Vals[1]);
|
|
|
+Vals[2]+=K[37];
|
|
|
W[5]+=(rotr(W[3],17)^rotr(W[3],19)^(W[3]>>10U));
|
|
|
-W[18]+=W[5];
|
|
|
-W[22]+=W[18];
|
|
|
-W[18]+=(rotr(W[19],2)^rotr(W[19],13)^rotr(W[19],22));
|
|
|
+Vals[2]+=W[5];
|
|
|
+Vals[6]+=Vals[2];
|
|
|
+Vals[2]+=(rotr(Vals[3],2)^rotr(Vals[3],13)^rotr(Vals[3],22));
|
|
|
W[6]+=(rotr(W[7],7)^rotr(W[7],18)^(W[7]>>3U));
|
|
|
W[6]+=W[15];
|
|
|
-W[17]+=(rotr(W[22],6)^rotr(W[22],11)^rotr(W[22],25));
|
|
|
-W[17]+=ch(W[22],W[23],W[16]);
|
|
|
+Vals[1]+=(rotr(Vals[6],6)^rotr(Vals[6],11)^rotr(Vals[6],25));
|
|
|
+Vals[1]+=ch(Vals[6],Vals[7],Vals[0]);
|
|
|
W[6]+=(rotr(W[4],17)^rotr(W[4],19)^(W[4]>>10U));
|
|
|
-W[17]+=K[38];
|
|
|
-W[17]+=W[6];
|
|
|
-W[18]+=Ma(W[21],W[19],W[20]);
|
|
|
-W[21]+=W[17];
|
|
|
-W[17]+=(rotr(W[18],2)^rotr(W[18],13)^rotr(W[18],22));
|
|
|
-W[17]+=Ma(W[20],W[18],W[19]);
|
|
|
+Vals[1]+=K[38];
|
|
|
+Vals[1]+=W[6];
|
|
|
+Vals[2]+=Ma(Vals[5],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=Vals[1];
|
|
|
+Vals[1]+=(rotr(Vals[2],2)^rotr(Vals[2],13)^rotr(Vals[2],22));
|
|
|
+Vals[1]+=Ma(Vals[4],Vals[2],Vals[3]);
|
|
|
W[7]+=(rotr(W[8],7)^rotr(W[8],18)^(W[8]>>3U));
|
|
|
W[7]+=W[0];
|
|
|
-W[16]+=(rotr(W[21],6)^rotr(W[21],11)^rotr(W[21],25));
|
|
|
-W[16]+=ch(W[21],W[22],W[23]);
|
|
|
-W[16]+=K[39];
|
|
|
+Vals[0]+=(rotr(Vals[5],6)^rotr(Vals[5],11)^rotr(Vals[5],25));
|
|
|
+Vals[0]+=ch(Vals[5],Vals[6],Vals[7]);
|
|
|
+Vals[0]+=K[39];
|
|
|
W[7]+=(rotr(W[5],17)^rotr(W[5],19)^(W[5]>>10U));
|
|
|
-W[16]+=W[7];
|
|
|
-W[20]+=W[16];
|
|
|
-W[16]+=(rotr(W[17],2)^rotr(W[17],13)^rotr(W[17],22));
|
|
|
+Vals[0]+=W[7];
|
|
|
+Vals[4]+=Vals[0];
|
|
|
+Vals[0]+=(rotr(Vals[1],2)^rotr(Vals[1],13)^rotr(Vals[1],22));
|
|
|
W[8]+=(rotr(W[9],7)^rotr(W[9],18)^(W[9]>>3U));
|
|
|
W[8]+=W[1];
|
|
|
-W[23]+=(rotr(W[20],6)^rotr(W[20],11)^rotr(W[20],25));
|
|
|
-W[23]+=ch(W[20],W[21],W[22]);
|
|
|
+Vals[7]+=(rotr(Vals[4],6)^rotr(Vals[4],11)^rotr(Vals[4],25));
|
|
|
+Vals[7]+=ch(Vals[4],Vals[5],Vals[6]);
|
|
|
W[8]+=(rotr(W[6],17)^rotr(W[6],19)^(W[6]>>10U));
|
|
|
-W[23]+=K[40];
|
|
|
-W[23]+=W[8];
|
|
|
-W[16]+=Ma(W[19],W[17],W[18]);
|
|
|
-W[19]+=W[23];
|
|
|
-W[23]+=(rotr(W[16],2)^rotr(W[16],13)^rotr(W[16],22));
|
|
|
-W[23]+=Ma(W[18],W[16],W[17]);
|
|
|
+Vals[7]+=K[40];
|
|
|
+Vals[7]+=W[8];
|
|
|
+Vals[0]+=Ma(Vals[3],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=Vals[7];
|
|
|
+Vals[7]+=(rotr(Vals[0],2)^rotr(Vals[0],13)^rotr(Vals[0],22));
|
|
|
+Vals[7]+=Ma(Vals[2],Vals[0],Vals[1]);
|
|
|
W[9]+=(rotr(W[10],7)^rotr(W[10],18)^(W[10]>>3U));
|
|
|
W[9]+=W[2];
|
|
|
-W[22]+=(rotr(W[19],6)^rotr(W[19],11)^rotr(W[19],25));
|
|
|
-W[22]+=ch(W[19],W[20],W[21]);
|
|
|
-W[22]+=K[41];
|
|
|
+Vals[6]+=(rotr(Vals[3],6)^rotr(Vals[3],11)^rotr(Vals[3],25));
|
|
|
+Vals[6]+=ch(Vals[3],Vals[4],Vals[5]);
|
|
|
+Vals[6]+=K[41];
|
|
|
W[9]+=(rotr(W[7],17)^rotr(W[7],19)^(W[7]>>10U));
|
|
|
-W[22]+=W[9];
|
|
|
-W[18]+=W[22];
|
|
|
-W[22]+=(rotr(W[23],2)^rotr(W[23],13)^rotr(W[23],22));
|
|
|
+Vals[6]+=W[9];
|
|
|
+Vals[2]+=Vals[6];
|
|
|
+Vals[6]+=(rotr(Vals[7],2)^rotr(Vals[7],13)^rotr(Vals[7],22));
|
|
|
W[10]+=(rotr(W[11],7)^rotr(W[11],18)^(W[11]>>3U));
|
|
|
W[10]+=W[3];
|
|
|
-W[21]+=(rotr(W[18],6)^rotr(W[18],11)^rotr(W[18],25));
|
|
|
-W[21]+=ch(W[18],W[19],W[20]);
|
|
|
+Vals[5]+=(rotr(Vals[2],6)^rotr(Vals[2],11)^rotr(Vals[2],25));
|
|
|
+Vals[5]+=ch(Vals[2],Vals[3],Vals[4]);
|
|
|
W[10]+=(rotr(W[8],17)^rotr(W[8],19)^(W[8]>>10U));
|
|
|
-W[21]+=K[42];
|
|
|
-W[21]+=W[10];
|
|
|
-W[22]+=Ma(W[17],W[23],W[16]);
|
|
|
-W[17]+=W[21];
|
|
|
-W[21]+=(rotr(W[22],2)^rotr(W[22],13)^rotr(W[22],22));
|
|
|
-W[21]+=Ma(W[16],W[22],W[23]);
|
|
|
+Vals[5]+=K[42];
|
|
|
+Vals[5]+=W[10];
|
|
|
+Vals[6]+=Ma(Vals[1],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=Vals[5];
|
|
|
+Vals[5]+=(rotr(Vals[6],2)^rotr(Vals[6],13)^rotr(Vals[6],22));
|
|
|
+Vals[5]+=Ma(Vals[0],Vals[6],Vals[7]);
|
|
|
W[11]+=(rotr(W[12],7)^rotr(W[12],18)^(W[12]>>3U));
|
|
|
W[11]+=W[4];
|
|
|
-W[20]+=(rotr(W[17],6)^rotr(W[17],11)^rotr(W[17],25));
|
|
|
-W[20]+=ch(W[17],W[18],W[19]);
|
|
|
-W[20]+=K[43];
|
|
|
+Vals[4]+=(rotr(Vals[1],6)^rotr(Vals[1],11)^rotr(Vals[1],25));
|
|
|
+Vals[4]+=ch(Vals[1],Vals[2],Vals[3]);
|
|
|
+Vals[4]+=K[43];
|
|
|
W[11]+=(rotr(W[9],17)^rotr(W[9],19)^(W[9]>>10U));
|
|
|
-W[20]+=W[11];
|
|
|
-W[16]+=W[20];
|
|
|
-W[20]+=(rotr(W[21],2)^rotr(W[21],13)^rotr(W[21],22));
|
|
|
+Vals[4]+=W[11];
|
|
|
+Vals[0]+=Vals[4];
|
|
|
+Vals[4]+=(rotr(Vals[5],2)^rotr(Vals[5],13)^rotr(Vals[5],22));
|
|
|
W[12]+=(rotr(W[13],7)^rotr(W[13],18)^(W[13]>>3U));
|
|
|
W[12]+=W[5];
|
|
|
-W[19]+=(rotr(W[16],6)^rotr(W[16],11)^rotr(W[16],25));
|
|
|
-W[19]+=ch(W[16],W[17],W[18]);
|
|
|
+Vals[3]+=(rotr(Vals[0],6)^rotr(Vals[0],11)^rotr(Vals[0],25));
|
|
|
+Vals[3]+=ch(Vals[0],Vals[1],Vals[2]);
|
|
|
W[12]+=(rotr(W[10],17)^rotr(W[10],19)^(W[10]>>10U));
|
|
|
-W[19]+=K[44];
|
|
|
-W[19]+=W[12];
|
|
|
-W[20]+=Ma(W[23],W[21],W[22]);
|
|
|
-W[23]+=W[19];
|
|
|
-W[19]+=(rotr(W[20],2)^rotr(W[20],13)^rotr(W[20],22));
|
|
|
-W[19]+=Ma(W[22],W[20],W[21]);
|
|
|
+Vals[3]+=K[44];
|
|
|
+Vals[3]+=W[12];
|
|
|
+Vals[4]+=Ma(Vals[7],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=Vals[3];
|
|
|
+Vals[3]+=(rotr(Vals[4],2)^rotr(Vals[4],13)^rotr(Vals[4],22));
|
|
|
+Vals[3]+=Ma(Vals[6],Vals[4],Vals[5]);
|
|
|
W[13]+=(rotr(W[14],7)^rotr(W[14],18)^(W[14]>>3U));
|
|
|
W[13]+=W[6];
|
|
|
-W[18]+=(rotr(W[23],6)^rotr(W[23],11)^rotr(W[23],25));
|
|
|
-W[18]+=ch(W[23],W[16],W[17]);
|
|
|
-W[18]+=K[45];
|
|
|
+Vals[2]+=(rotr(Vals[7],6)^rotr(Vals[7],11)^rotr(Vals[7],25));
|
|
|
+Vals[2]+=ch(Vals[7],Vals[0],Vals[1]);
|
|
|
+Vals[2]+=K[45];
|
|
|
W[13]+=(rotr(W[11],17)^rotr(W[11],19)^(W[11]>>10U));
|
|
|
-W[18]+=W[13];
|
|
|
-W[22]+=W[18];
|
|
|
-W[18]+=(rotr(W[19],2)^rotr(W[19],13)^rotr(W[19],22));
|
|
|
+Vals[2]+=W[13];
|
|
|
+Vals[6]+=Vals[2];
|
|
|
+Vals[2]+=(rotr(Vals[3],2)^rotr(Vals[3],13)^rotr(Vals[3],22));
|
|
|
W[14]+=(rotr(W[15],7)^rotr(W[15],18)^(W[15]>>3U));
|
|
|
W[14]+=W[7];
|
|
|
-W[17]+=(rotr(W[22],6)^rotr(W[22],11)^rotr(W[22],25));
|
|
|
-W[17]+=ch(W[22],W[23],W[16]);
|
|
|
+Vals[1]+=(rotr(Vals[6],6)^rotr(Vals[6],11)^rotr(Vals[6],25));
|
|
|
+Vals[1]+=ch(Vals[6],Vals[7],Vals[0]);
|
|
|
W[14]+=(rotr(W[12],17)^rotr(W[12],19)^(W[12]>>10U));
|
|
|
-W[17]+=K[46];
|
|
|
-W[17]+=W[14];
|
|
|
-W[18]+=Ma(W[21],W[19],W[20]);
|
|
|
-W[21]+=W[17];
|
|
|
-W[17]+=(rotr(W[18],2)^rotr(W[18],13)^rotr(W[18],22));
|
|
|
-W[17]+=Ma(W[20],W[18],W[19]);
|
|
|
+Vals[1]+=K[46];
|
|
|
+Vals[1]+=W[14];
|
|
|
+Vals[2]+=Ma(Vals[5],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=Vals[1];
|
|
|
+Vals[1]+=(rotr(Vals[2],2)^rotr(Vals[2],13)^rotr(Vals[2],22));
|
|
|
+Vals[1]+=Ma(Vals[4],Vals[2],Vals[3]);
|
|
|
W[15]+=(rotr(W[0],7)^rotr(W[0],18)^(W[0]>>3U));
|
|
|
W[15]+=W[8];
|
|
|
-W[16]+=(rotr(W[21],6)^rotr(W[21],11)^rotr(W[21],25));
|
|
|
-W[16]+=ch(W[21],W[22],W[23]);
|
|
|
-W[16]+=K[47];
|
|
|
+Vals[0]+=(rotr(Vals[5],6)^rotr(Vals[5],11)^rotr(Vals[5],25));
|
|
|
+Vals[0]+=ch(Vals[5],Vals[6],Vals[7]);
|
|
|
+Vals[0]+=K[47];
|
|
|
W[15]+=(rotr(W[13],17)^rotr(W[13],19)^(W[13]>>10U));
|
|
|
-W[16]+=W[15];
|
|
|
-W[20]+=W[16];
|
|
|
-W[16]+=(rotr(W[17],2)^rotr(W[17],13)^rotr(W[17],22));
|
|
|
+Vals[0]+=W[15];
|
|
|
+Vals[4]+=Vals[0];
|
|
|
+Vals[0]+=(rotr(Vals[1],2)^rotr(Vals[1],13)^rotr(Vals[1],22));
|
|
|
W[0]+=(rotr(W[1],7)^rotr(W[1],18)^(W[1]>>3U));
|
|
|
W[0]+=W[9];
|
|
|
-W[23]+=(rotr(W[20],6)^rotr(W[20],11)^rotr(W[20],25));
|
|
|
-W[23]+=ch(W[20],W[21],W[22]);
|
|
|
+Vals[7]+=(rotr(Vals[4],6)^rotr(Vals[4],11)^rotr(Vals[4],25));
|
|
|
+Vals[7]+=ch(Vals[4],Vals[5],Vals[6]);
|
|
|
W[0]+=(rotr(W[14],17)^rotr(W[14],19)^(W[14]>>10U));
|
|
|
-W[23]+=K[48];
|
|
|
-W[23]+=W[0];
|
|
|
-W[16]+=Ma(W[19],W[17],W[18]);
|
|
|
-W[19]+=W[23];
|
|
|
-W[23]+=(rotr(W[16],2)^rotr(W[16],13)^rotr(W[16],22));
|
|
|
-W[23]+=Ma(W[18],W[16],W[17]);
|
|
|
+Vals[7]+=K[48];
|
|
|
+Vals[7]+=W[0];
|
|
|
+Vals[0]+=Ma(Vals[3],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=Vals[7];
|
|
|
+Vals[7]+=(rotr(Vals[0],2)^rotr(Vals[0],13)^rotr(Vals[0],22));
|
|
|
+Vals[7]+=Ma(Vals[2],Vals[0],Vals[1]);
|
|
|
W[1]+=(rotr(W[2],7)^rotr(W[2],18)^(W[2]>>3U));
|
|
|
W[1]+=W[10];
|
|
|
-W[22]+=(rotr(W[19],6)^rotr(W[19],11)^rotr(W[19],25));
|
|
|
-W[22]+=ch(W[19],W[20],W[21]);
|
|
|
-W[22]+=K[49];
|
|
|
+Vals[6]+=(rotr(Vals[3],6)^rotr(Vals[3],11)^rotr(Vals[3],25));
|
|
|
+Vals[6]+=ch(Vals[3],Vals[4],Vals[5]);
|
|
|
+Vals[6]+=K[49];
|
|
|
W[1]+=(rotr(W[15],17)^rotr(W[15],19)^(W[15]>>10U));
|
|
|
-W[22]+=W[1];
|
|
|
-W[18]+=W[22];
|
|
|
-W[22]+=(rotr(W[23],2)^rotr(W[23],13)^rotr(W[23],22));
|
|
|
+Vals[6]+=W[1];
|
|
|
+Vals[2]+=Vals[6];
|
|
|
+Vals[6]+=(rotr(Vals[7],2)^rotr(Vals[7],13)^rotr(Vals[7],22));
|
|
|
W[2]+=(rotr(W[3],7)^rotr(W[3],18)^(W[3]>>3U));
|
|
|
W[2]+=W[11];
|
|
|
-W[21]+=(rotr(W[18],6)^rotr(W[18],11)^rotr(W[18],25));
|
|
|
-W[21]+=ch(W[18],W[19],W[20]);
|
|
|
+Vals[5]+=(rotr(Vals[2],6)^rotr(Vals[2],11)^rotr(Vals[2],25));
|
|
|
+Vals[5]+=ch(Vals[2],Vals[3],Vals[4]);
|
|
|
W[2]+=(rotr(W[0],17)^rotr(W[0],19)^(W[0]>>10U));
|
|
|
-W[21]+=K[50];
|
|
|
-W[21]+=W[2];
|
|
|
-W[22]+=Ma(W[17],W[23],W[16]);
|
|
|
-W[17]+=W[21];
|
|
|
-W[21]+=(rotr(W[22],2)^rotr(W[22],13)^rotr(W[22],22));
|
|
|
-W[21]+=Ma(W[16],W[22],W[23]);
|
|
|
+Vals[5]+=K[50];
|
|
|
+Vals[5]+=W[2];
|
|
|
+Vals[6]+=Ma(Vals[1],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=Vals[5];
|
|
|
+Vals[5]+=(rotr(Vals[6],2)^rotr(Vals[6],13)^rotr(Vals[6],22));
|
|
|
+Vals[5]+=Ma(Vals[0],Vals[6],Vals[7]);
|
|
|
W[3]+=(rotr(W[4],7)^rotr(W[4],18)^(W[4]>>3U));
|
|
|
W[3]+=W[12];
|
|
|
-W[20]+=(rotr(W[17],6)^rotr(W[17],11)^rotr(W[17],25));
|
|
|
-W[20]+=ch(W[17],W[18],W[19]);
|
|
|
-W[20]+=K[51];
|
|
|
+Vals[4]+=(rotr(Vals[1],6)^rotr(Vals[1],11)^rotr(Vals[1],25));
|
|
|
+Vals[4]+=ch(Vals[1],Vals[2],Vals[3]);
|
|
|
+Vals[4]+=K[51];
|
|
|
W[3]+=(rotr(W[1],17)^rotr(W[1],19)^(W[1]>>10U));
|
|
|
-W[20]+=W[3];
|
|
|
-W[16]+=W[20];
|
|
|
-W[20]+=(rotr(W[21],2)^rotr(W[21],13)^rotr(W[21],22));
|
|
|
+Vals[4]+=W[3];
|
|
|
+Vals[0]+=Vals[4];
|
|
|
+Vals[4]+=(rotr(Vals[5],2)^rotr(Vals[5],13)^rotr(Vals[5],22));
|
|
|
W[4]+=(rotr(W[5],7)^rotr(W[5],18)^(W[5]>>3U));
|
|
|
W[4]+=W[13];
|
|
|
-W[19]+=(rotr(W[16],6)^rotr(W[16],11)^rotr(W[16],25));
|
|
|
-W[19]+=ch(W[16],W[17],W[18]);
|
|
|
+Vals[3]+=(rotr(Vals[0],6)^rotr(Vals[0],11)^rotr(Vals[0],25));
|
|
|
+Vals[3]+=ch(Vals[0],Vals[1],Vals[2]);
|
|
|
W[4]+=(rotr(W[2],17)^rotr(W[2],19)^(W[2]>>10U));
|
|
|
-W[19]+=K[52];
|
|
|
-W[19]+=W[4];
|
|
|
-W[20]+=Ma(W[23],W[21],W[22]);
|
|
|
-W[23]+=W[19];
|
|
|
-W[19]+=(rotr(W[20],2)^rotr(W[20],13)^rotr(W[20],22));
|
|
|
-W[19]+=Ma(W[22],W[20],W[21]);
|
|
|
+Vals[3]+=K[52];
|
|
|
+Vals[3]+=W[4];
|
|
|
+Vals[4]+=Ma(Vals[7],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=Vals[3];
|
|
|
+Vals[3]+=(rotr(Vals[4],2)^rotr(Vals[4],13)^rotr(Vals[4],22));
|
|
|
+Vals[3]+=Ma(Vals[6],Vals[4],Vals[5]);
|
|
|
W[5]+=(rotr(W[6],7)^rotr(W[6],18)^(W[6]>>3U));
|
|
|
W[5]+=W[14];
|
|
|
-W[18]+=(rotr(W[23],6)^rotr(W[23],11)^rotr(W[23],25));
|
|
|
-W[18]+=ch(W[23],W[16],W[17]);
|
|
|
-W[18]+=K[53];
|
|
|
+Vals[2]+=(rotr(Vals[7],6)^rotr(Vals[7],11)^rotr(Vals[7],25));
|
|
|
+Vals[2]+=ch(Vals[7],Vals[0],Vals[1]);
|
|
|
+Vals[2]+=K[53];
|
|
|
W[5]+=(rotr(W[3],17)^rotr(W[3],19)^(W[3]>>10U));
|
|
|
-W[18]+=W[5];
|
|
|
-W[22]+=W[18];
|
|
|
-W[18]+=(rotr(W[19],2)^rotr(W[19],13)^rotr(W[19],22));
|
|
|
+Vals[2]+=W[5];
|
|
|
+Vals[6]+=Vals[2];
|
|
|
+Vals[2]+=(rotr(Vals[3],2)^rotr(Vals[3],13)^rotr(Vals[3],22));
|
|
|
W[6]+=(rotr(W[7],7)^rotr(W[7],18)^(W[7]>>3U));
|
|
|
W[6]+=W[15];
|
|
|
-W[17]+=(rotr(W[22],6)^rotr(W[22],11)^rotr(W[22],25));
|
|
|
-W[17]+=ch(W[22],W[23],W[16]);
|
|
|
+Vals[1]+=(rotr(Vals[6],6)^rotr(Vals[6],11)^rotr(Vals[6],25));
|
|
|
+Vals[1]+=ch(Vals[6],Vals[7],Vals[0]);
|
|
|
W[6]+=(rotr(W[4],17)^rotr(W[4],19)^(W[4]>>10U));
|
|
|
-W[17]+=K[54];
|
|
|
-W[17]+=W[6];
|
|
|
-W[18]+=Ma(W[21],W[19],W[20]);
|
|
|
-W[21]+=W[17];
|
|
|
-W[17]+=(rotr(W[18],2)^rotr(W[18],13)^rotr(W[18],22));
|
|
|
-W[17]+=Ma(W[20],W[18],W[19]);
|
|
|
+Vals[1]+=K[54];
|
|
|
+Vals[1]+=W[6];
|
|
|
+Vals[2]+=Ma(Vals[5],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=Vals[1];
|
|
|
+Vals[1]+=(rotr(Vals[2],2)^rotr(Vals[2],13)^rotr(Vals[2],22));
|
|
|
+Vals[1]+=Ma(Vals[4],Vals[2],Vals[3]);
|
|
|
W[7]+=(rotr(W[8],7)^rotr(W[8],18)^(W[8]>>3U));
|
|
|
W[7]+=W[0];
|
|
|
-W[16]+=(rotr(W[21],6)^rotr(W[21],11)^rotr(W[21],25));
|
|
|
-W[16]+=ch(W[21],W[22],W[23]);
|
|
|
-W[16]+=K[55];
|
|
|
+Vals[0]+=(rotr(Vals[5],6)^rotr(Vals[5],11)^rotr(Vals[5],25));
|
|
|
+Vals[0]+=ch(Vals[5],Vals[6],Vals[7]);
|
|
|
+Vals[0]+=K[55];
|
|
|
W[7]+=(rotr(W[5],17)^rotr(W[5],19)^(W[5]>>10U));
|
|
|
-W[16]+=W[7];
|
|
|
-W[20]+=W[16];
|
|
|
-W[16]+=(rotr(W[17],2)^rotr(W[17],13)^rotr(W[17],22));
|
|
|
+Vals[0]+=W[7];
|
|
|
+Vals[4]+=Vals[0];
|
|
|
+Vals[0]+=(rotr(Vals[1],2)^rotr(Vals[1],13)^rotr(Vals[1],22));
|
|
|
W[8]+=(rotr(W[9],7)^rotr(W[9],18)^(W[9]>>3U));
|
|
|
W[8]+=W[1];
|
|
|
-W[23]+=(rotr(W[20],6)^rotr(W[20],11)^rotr(W[20],25));
|
|
|
-W[23]+=ch(W[20],W[21],W[22]);
|
|
|
+Vals[7]+=(rotr(Vals[4],6)^rotr(Vals[4],11)^rotr(Vals[4],25));
|
|
|
+Vals[7]+=ch(Vals[4],Vals[5],Vals[6]);
|
|
|
W[8]+=(rotr(W[6],17)^rotr(W[6],19)^(W[6]>>10U));
|
|
|
-W[23]+=K[56];
|
|
|
-W[23]+=W[8];
|
|
|
-W[16]+=Ma(W[19],W[17],W[18]);
|
|
|
-W[19]+=W[23];
|
|
|
-W[23]+=(rotr(W[16],2)^rotr(W[16],13)^rotr(W[16],22));
|
|
|
-W[23]+=Ma(W[18],W[16],W[17]);
|
|
|
+Vals[7]+=K[56];
|
|
|
+Vals[7]+=W[8];
|
|
|
+Vals[0]+=Ma(Vals[3],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=Vals[7];
|
|
|
+Vals[7]+=(rotr(Vals[0],2)^rotr(Vals[0],13)^rotr(Vals[0],22));
|
|
|
+Vals[7]+=Ma(Vals[2],Vals[0],Vals[1]);
|
|
|
W[9]+=(rotr(W[10],7)^rotr(W[10],18)^(W[10]>>3U));
|
|
|
W[9]+=W[2];
|
|
|
-W[22]+=(rotr(W[19],6)^rotr(W[19],11)^rotr(W[19],25));
|
|
|
-W[22]+=ch(W[19],W[20],W[21]);
|
|
|
-W[22]+=K[57];
|
|
|
+Vals[6]+=(rotr(Vals[3],6)^rotr(Vals[3],11)^rotr(Vals[3],25));
|
|
|
+Vals[6]+=ch(Vals[3],Vals[4],Vals[5]);
|
|
|
+Vals[6]+=K[57];
|
|
|
W[9]+=(rotr(W[7],17)^rotr(W[7],19)^(W[7]>>10U));
|
|
|
-W[22]+=W[9];
|
|
|
-W[18]+=W[22];
|
|
|
-W[22]+=(rotr(W[23],2)^rotr(W[23],13)^rotr(W[23],22));
|
|
|
+Vals[6]+=W[9];
|
|
|
+Vals[2]+=Vals[6];
|
|
|
+Vals[6]+=(rotr(Vals[7],2)^rotr(Vals[7],13)^rotr(Vals[7],22));
|
|
|
W[10]+=(rotr(W[11],7)^rotr(W[11],18)^(W[11]>>3U));
|
|
|
W[10]+=W[3];
|
|
|
-W[21]+=(rotr(W[18],6)^rotr(W[18],11)^rotr(W[18],25));
|
|
|
-W[21]+=ch(W[18],W[19],W[20]);
|
|
|
+Vals[5]+=(rotr(Vals[2],6)^rotr(Vals[2],11)^rotr(Vals[2],25));
|
|
|
+Vals[5]+=ch(Vals[2],Vals[3],Vals[4]);
|
|
|
W[10]+=(rotr(W[8],17)^rotr(W[8],19)^(W[8]>>10U));
|
|
|
-W[21]+=K[58];
|
|
|
-W[21]+=W[10];
|
|
|
-W[22]+=Ma(W[17],W[23],W[16]);
|
|
|
-W[17]+=W[21];
|
|
|
-W[21]+=(rotr(W[22],2)^rotr(W[22],13)^rotr(W[22],22));
|
|
|
-W[21]+=Ma(W[16],W[22],W[23]);
|
|
|
+Vals[5]+=K[58];
|
|
|
+Vals[5]+=W[10];
|
|
|
+Vals[6]+=Ma(Vals[1],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=Vals[5];
|
|
|
+Vals[5]+=(rotr(Vals[6],2)^rotr(Vals[6],13)^rotr(Vals[6],22));
|
|
|
+Vals[5]+=Ma(Vals[0],Vals[6],Vals[7]);
|
|
|
W[11]+=(rotr(W[12],7)^rotr(W[12],18)^(W[12]>>3U));
|
|
|
W[11]+=W[4];
|
|
|
-W[20]+=(rotr(W[17],6)^rotr(W[17],11)^rotr(W[17],25));
|
|
|
-W[20]+=ch(W[17],W[18],W[19]);
|
|
|
-W[20]+=K[59];
|
|
|
+Vals[4]+=(rotr(Vals[1],6)^rotr(Vals[1],11)^rotr(Vals[1],25));
|
|
|
+Vals[4]+=ch(Vals[1],Vals[2],Vals[3]);
|
|
|
+Vals[4]+=K[59];
|
|
|
W[11]+=(rotr(W[9],17)^rotr(W[9],19)^(W[9]>>10U));
|
|
|
-W[20]+=W[11];
|
|
|
-W[16]+=W[20];
|
|
|
-W[20]+=(rotr(W[21],2)^rotr(W[21],13)^rotr(W[21],22));
|
|
|
+Vals[4]+=W[11];
|
|
|
+Vals[0]+=Vals[4];
|
|
|
+Vals[4]+=(rotr(Vals[5],2)^rotr(Vals[5],13)^rotr(Vals[5],22));
|
|
|
W[12]+=(rotr(W[13],7)^rotr(W[13],18)^(W[13]>>3U));
|
|
|
W[12]+=W[5];
|
|
|
-W[19]+=(rotr(W[16],6)^rotr(W[16],11)^rotr(W[16],25));
|
|
|
-W[19]+=ch(W[16],W[17],W[18]);
|
|
|
+Vals[3]+=(rotr(Vals[0],6)^rotr(Vals[0],11)^rotr(Vals[0],25));
|
|
|
+Vals[3]+=ch(Vals[0],Vals[1],Vals[2]);
|
|
|
W[12]+=(rotr(W[10],17)^rotr(W[10],19)^(W[10]>>10U));
|
|
|
-W[19]+=K[60];
|
|
|
-W[19]+=W[12];
|
|
|
-W[20]+=Ma(W[23],W[21],W[22]);
|
|
|
-W[23]+=W[19];
|
|
|
-W[19]+=(rotr(W[20],2)^rotr(W[20],13)^rotr(W[20],22));
|
|
|
-W[19]+=Ma(W[22],W[20],W[21]);
|
|
|
+Vals[3]+=K[60];
|
|
|
+Vals[3]+=W[12];
|
|
|
+Vals[4]+=Ma(Vals[7],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=Vals[3];
|
|
|
+Vals[3]+=(rotr(Vals[4],2)^rotr(Vals[4],13)^rotr(Vals[4],22));
|
|
|
+Vals[3]+=Ma(Vals[6],Vals[4],Vals[5]);
|
|
|
W[13]+=(rotr(W[14],7)^rotr(W[14],18)^(W[14]>>3U));
|
|
|
W[13]+=W[6];
|
|
|
-W[18]+=(rotr(W[23],6)^rotr(W[23],11)^rotr(W[23],25));
|
|
|
-W[18]+=ch(W[23],W[16],W[17]);
|
|
|
-W[18]+=K[61];
|
|
|
+Vals[2]+=(rotr(Vals[7],6)^rotr(Vals[7],11)^rotr(Vals[7],25));
|
|
|
+Vals[2]+=ch(Vals[7],Vals[0],Vals[1]);
|
|
|
+Vals[2]+=K[61];
|
|
|
W[13]+=(rotr(W[11],17)^rotr(W[11],19)^(W[11]>>10U));
|
|
|
-W[18]+=W[13];
|
|
|
-W[22]+=W[18];
|
|
|
-W[18]+=(rotr(W[19],2)^rotr(W[19],13)^rotr(W[19],22));
|
|
|
+Vals[2]+=W[13];
|
|
|
+Vals[6]+=Vals[2];
|
|
|
+Vals[2]+=(rotr(Vals[3],2)^rotr(Vals[3],13)^rotr(Vals[3],22));
|
|
|
W[14]+=(rotr(W[15],7)^rotr(W[15],18)^(W[15]>>3U));
|
|
|
W[14]+=W[7];
|
|
|
-W[17]+=(rotr(W[22],6)^rotr(W[22],11)^rotr(W[22],25));
|
|
|
-W[17]+=ch(W[22],W[23],W[16]);
|
|
|
+Vals[1]+=(rotr(Vals[6],6)^rotr(Vals[6],11)^rotr(Vals[6],25));
|
|
|
+Vals[1]+=ch(Vals[6],Vals[7],Vals[0]);
|
|
|
W[14]+=(rotr(W[12],17)^rotr(W[12],19)^(W[12]>>10U));
|
|
|
-W[17]+=K[62];
|
|
|
-W[17]+=W[14];
|
|
|
-W[18]+=Ma(W[21],W[19],W[20]);
|
|
|
-W[21]+=W[17];
|
|
|
-W[17]+=(rotr(W[18],2)^rotr(W[18],13)^rotr(W[18],22));
|
|
|
-W[17]+=Ma(W[20],W[18],W[19]);
|
|
|
+Vals[1]+=K[62];
|
|
|
+Vals[1]+=W[14];
|
|
|
+Vals[2]+=Ma(Vals[5],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=Vals[1];
|
|
|
+Vals[1]+=(rotr(Vals[2],2)^rotr(Vals[2],13)^rotr(Vals[2],22));
|
|
|
+Vals[1]+=Ma(Vals[4],Vals[2],Vals[3]);
|
|
|
W[15]+=(rotr(W[0],7)^rotr(W[0],18)^(W[0]>>3U));
|
|
|
W[15]+=W[8];
|
|
|
-W[16]+=(rotr(W[21],6)^rotr(W[21],11)^rotr(W[21],25));
|
|
|
-W[16]+=ch(W[21],W[22],W[23]);
|
|
|
-W[16]+=K[63];
|
|
|
+Vals[0]+=(rotr(Vals[5],6)^rotr(Vals[5],11)^rotr(Vals[5],25));
|
|
|
+Vals[0]+=ch(Vals[5],Vals[6],Vals[7]);
|
|
|
+Vals[0]+=K[63];
|
|
|
W[15]+=(rotr(W[13],17)^rotr(W[13],19)^(W[13]>>10U));
|
|
|
-W[16]+=W[15];
|
|
|
-W[20]+=W[16];
|
|
|
-W[16]+=(rotr(W[17],2)^rotr(W[17],13)^rotr(W[17],22));
|
|
|
-W[16]+=Ma(W[19],W[17],W[18]);
|
|
|
+Vals[0]+=W[15];
|
|
|
+Vals[4]+=Vals[0];
|
|
|
+Vals[0]+=(rotr(Vals[1],2)^rotr(Vals[1],13)^rotr(Vals[1],22));
|
|
|
+Vals[0]+=Ma(Vals[3],Vals[1],Vals[2]);
|
|
|
|
|
|
-W[0]=W[16];
|
|
|
+W[0]=Vals[0];
|
|
|
|
|
|
W[7]=state7;
|
|
|
-W[7]+=W[23];
|
|
|
+W[7]+=Vals[7];
|
|
|
|
|
|
-W[23]=0xF377ED68;
|
|
|
+Vals[7]=0xF377ED68;
|
|
|
W[0]+=state0;
|
|
|
-W[23]+=W[0];
|
|
|
+Vals[7]+=W[0];
|
|
|
|
|
|
W[3]=state3;
|
|
|
-W[3]+=W[19];
|
|
|
+W[3]+=Vals[3];
|
|
|
|
|
|
-W[19]=0xa54ff53a;
|
|
|
-W[19]+=W[23];
|
|
|
+Vals[3]=0xa54ff53a;
|
|
|
+Vals[3]+=Vals[7];
|
|
|
|
|
|
-W[1]=W[17];
|
|
|
+W[1]=Vals[1];
|
|
|
W[1]+=state1;
|
|
|
|
|
|
W[6]=state6;
|
|
|
-W[6]+=W[22];
|
|
|
+W[6]+=Vals[6];
|
|
|
|
|
|
-W[22]=0x90BB1E3C;
|
|
|
-W[22]+=(rotr(W[19],6)^rotr(W[19],11)^rotr(W[19],25));
|
|
|
-W[22]+=(0x9b05688cU^(W[19]&0xca0b3af3U));
|
|
|
+Vals[6]=0x90BB1E3C;
|
|
|
+Vals[6]+=(rotr(Vals[3],6)^rotr(Vals[3],11)^rotr(Vals[3],25));
|
|
|
+Vals[6]+=(0x9b05688cU^(Vals[3]&0xca0b3af3U));
|
|
|
|
|
|
W[2]=state2;
|
|
|
-W[2]+=W[18];
|
|
|
+W[2]+=Vals[2];
|
|
|
|
|
|
-W[18]=0x3c6ef372U;
|
|
|
-W[22]+=W[1];
|
|
|
-W[18]+=W[22];
|
|
|
-W[23]+=0x08909ae5U;
|
|
|
-W[22]+=(rotr(W[23],2)^rotr(W[23],13)^rotr(W[23],22));
|
|
|
+Vals[2]=0x3c6ef372U;
|
|
|
+Vals[6]+=W[1];
|
|
|
+Vals[2]+=Vals[6];
|
|
|
+Vals[7]+=0x08909ae5U;
|
|
|
+Vals[6]+=(rotr(Vals[7],2)^rotr(Vals[7],13)^rotr(Vals[7],22));
|
|
|
|
|
|
W[5]=state5;
|
|
|
-W[5]+=W[21];
|
|
|
+W[5]+=Vals[5];
|
|
|
|
|
|
-W[21]=0x150C6645B;
|
|
|
-W[21]+=(rotr(W[18],6)^rotr(W[18],11)^rotr(W[18],25));
|
|
|
-W[21]+=ch(W[18],W[19],0x510e527fU);
|
|
|
-W[21]+=W[2];
|
|
|
+Vals[5]=0x150C6645B;
|
|
|
+Vals[5]+=(rotr(Vals[2],6)^rotr(Vals[2],11)^rotr(Vals[2],25));
|
|
|
+Vals[5]+=ch(Vals[2],Vals[3],0x510e527fU);
|
|
|
+Vals[5]+=W[2];
|
|
|
|
|
|
-W[17]=0xbb67ae85U;
|
|
|
-W[17]+=W[21];
|
|
|
-W[22]+=Ma2(0xbb67ae85U,W[23],0x6a09e667U);
|
|
|
-W[21]+=(rotr(W[22],2)^rotr(W[22],13)^rotr(W[22],22));
|
|
|
+Vals[1]=0xbb67ae85U;
|
|
|
+Vals[1]+=Vals[5];
|
|
|
+Vals[6]+=Ma2(0xbb67ae85U,Vals[7],0x6a09e667U);
|
|
|
+Vals[5]+=(rotr(Vals[6],2)^rotr(Vals[6],13)^rotr(Vals[6],22));
|
|
|
|
|
|
W[4]=state4;
|
|
|
-W[4]+=W[20];
|
|
|
-
|
|
|
-W[20]=0x13AC42E24;
|
|
|
-W[20]+=(rotr(W[17],6)^rotr(W[17],11)^rotr(W[17],25));
|
|
|
-W[20]+=ch(W[17],W[18],W[19]);
|
|
|
-W[20]+=W[3];
|
|
|
-
|
|
|
-W[16]=W[20];
|
|
|
-W[16]+=0x6a09e667U;
|
|
|
-W[21]+=Ma2(0x6a09e667U,W[22],W[23]);
|
|
|
-W[20]+=(rotr(W[21],2)^rotr(W[21],13)^rotr(W[21],22));
|
|
|
-W[19]+=(rotr(W[16],6)^rotr(W[16],11)^rotr(W[16],25));
|
|
|
-W[19]+=ch(W[16],W[17],W[18]);
|
|
|
-W[19]+=K[4];
|
|
|
-W[19]+=W[4];
|
|
|
-W[20]+=Ma(W[23],W[21],W[22]);
|
|
|
-W[23]+=W[19];
|
|
|
-W[19]+=(rotr(W[20],2)^rotr(W[20],13)^rotr(W[20],22));
|
|
|
-W[19]+=Ma(W[22],W[20],W[21]);
|
|
|
-W[18]+=(rotr(W[23],6)^rotr(W[23],11)^rotr(W[23],25));
|
|
|
-W[18]+=ch(W[23],W[16],W[17]);
|
|
|
-W[18]+=K[5];
|
|
|
-W[18]+=W[5];
|
|
|
-W[22]+=W[18];
|
|
|
-W[18]+=(rotr(W[19],2)^rotr(W[19],13)^rotr(W[19],22));
|
|
|
-W[17]+=(rotr(W[22],6)^rotr(W[22],11)^rotr(W[22],25));
|
|
|
-W[17]+=ch(W[22],W[23],W[16]);
|
|
|
-W[17]+=K[6];
|
|
|
-W[17]+=W[6];
|
|
|
-W[18]+=Ma(W[21],W[19],W[20]);
|
|
|
-W[21]+=W[17];
|
|
|
-W[17]+=(rotr(W[18],2)^rotr(W[18],13)^rotr(W[18],22));
|
|
|
-W[17]+=Ma(W[20],W[18],W[19]);
|
|
|
-W[16]+=(rotr(W[21],6)^rotr(W[21],11)^rotr(W[21],25));
|
|
|
-W[16]+=ch(W[21],W[22],W[23]);
|
|
|
-W[16]+=K[7];
|
|
|
-W[16]+=W[7];
|
|
|
-W[20]+=W[16];
|
|
|
-W[16]+=(rotr(W[17],2)^rotr(W[17],13)^rotr(W[17],22));
|
|
|
-W[23]+=(rotr(W[20],6)^rotr(W[20],11)^rotr(W[20],25));
|
|
|
-W[23]+=ch(W[20],W[21],W[22]);
|
|
|
-W[23]+=0x15807AA98;
|
|
|
-W[16]+=Ma(W[19],W[17],W[18]);
|
|
|
-W[19]+=W[23];
|
|
|
-W[23]+=(rotr(W[16],2)^rotr(W[16],13)^rotr(W[16],22));
|
|
|
-W[23]+=Ma(W[18],W[16],W[17]);
|
|
|
-W[22]+=(rotr(W[19],6)^rotr(W[19],11)^rotr(W[19],25));
|
|
|
-W[22]+=ch(W[19],W[20],W[21]);
|
|
|
-W[22]+=K[9];
|
|
|
-W[18]+=W[22];
|
|
|
-W[22]+=(rotr(W[23],2)^rotr(W[23],13)^rotr(W[23],22));
|
|
|
-W[22]+=Ma(W[17],W[23],W[16]);
|
|
|
-W[21]+=(rotr(W[18],6)^rotr(W[18],11)^rotr(W[18],25));
|
|
|
-W[21]+=ch(W[18],W[19],W[20]);
|
|
|
-W[21]+=K[10];
|
|
|
-W[17]+=W[21];
|
|
|
-W[21]+=(rotr(W[22],2)^rotr(W[22],13)^rotr(W[22],22));
|
|
|
-W[21]+=Ma(W[16],W[22],W[23]);
|
|
|
-W[20]+=(rotr(W[17],6)^rotr(W[17],11)^rotr(W[17],25));
|
|
|
-W[20]+=ch(W[17],W[18],W[19]);
|
|
|
-W[20]+=K[11];
|
|
|
-W[16]+=W[20];
|
|
|
-W[20]+=(rotr(W[21],2)^rotr(W[21],13)^rotr(W[21],22));
|
|
|
-W[20]+=Ma(W[23],W[21],W[22]);
|
|
|
-W[19]+=(rotr(W[16],6)^rotr(W[16],11)^rotr(W[16],25));
|
|
|
-W[19]+=ch(W[16],W[17],W[18]);
|
|
|
-W[19]+=K[12];
|
|
|
-W[23]+=W[19];
|
|
|
-W[19]+=(rotr(W[20],2)^rotr(W[20],13)^rotr(W[20],22));
|
|
|
-W[19]+=Ma(W[22],W[20],W[21]);
|
|
|
-W[18]+=(rotr(W[23],6)^rotr(W[23],11)^rotr(W[23],25));
|
|
|
-W[18]+=ch(W[23],W[16],W[17]);
|
|
|
-W[18]+=K[13];
|
|
|
-W[22]+=W[18];
|
|
|
-W[18]+=(rotr(W[19],2)^rotr(W[19],13)^rotr(W[19],22));
|
|
|
-W[18]+=Ma(W[21],W[19],W[20]);
|
|
|
-W[17]+=(rotr(W[22],6)^rotr(W[22],11)^rotr(W[22],25));
|
|
|
-W[17]+=ch(W[22],W[23],W[16]);
|
|
|
-W[17]+=K[14];
|
|
|
-W[21]+=W[17];
|
|
|
-W[17]+=(rotr(W[18],2)^rotr(W[18],13)^rotr(W[18],22));
|
|
|
-W[17]+=Ma(W[20],W[18],W[19]);
|
|
|
-W[16]+=(rotr(W[21],6)^rotr(W[21],11)^rotr(W[21],25));
|
|
|
-W[16]+=ch(W[21],W[22],W[23]);
|
|
|
-W[16]+=0xC19BF274;
|
|
|
-W[20]+=W[16];
|
|
|
-W[16]+=(rotr(W[17],2)^rotr(W[17],13)^rotr(W[17],22));
|
|
|
-W[23]+=(rotr(W[20],6)^rotr(W[20],11)^rotr(W[20],25));
|
|
|
-W[23]+=ch(W[20],W[21],W[22]);
|
|
|
+W[4]+=Vals[4];
|
|
|
+
|
|
|
+Vals[4]=0x13AC42E24;
|
|
|
+Vals[4]+=(rotr(Vals[1],6)^rotr(Vals[1],11)^rotr(Vals[1],25));
|
|
|
+Vals[4]+=ch(Vals[1],Vals[2],Vals[3]);
|
|
|
+Vals[4]+=W[3];
|
|
|
+
|
|
|
+Vals[0]=Vals[4];
|
|
|
+Vals[0]+=0x6a09e667U;
|
|
|
+Vals[5]+=Ma2(0x6a09e667U,Vals[6],Vals[7]);
|
|
|
+Vals[4]+=(rotr(Vals[5],2)^rotr(Vals[5],13)^rotr(Vals[5],22));
|
|
|
+Vals[3]+=(rotr(Vals[0],6)^rotr(Vals[0],11)^rotr(Vals[0],25));
|
|
|
+Vals[3]+=ch(Vals[0],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=K[4];
|
|
|
+Vals[3]+=W[4];
|
|
|
+Vals[4]+=Ma(Vals[7],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=Vals[3];
|
|
|
+Vals[3]+=(rotr(Vals[4],2)^rotr(Vals[4],13)^rotr(Vals[4],22));
|
|
|
+Vals[3]+=Ma(Vals[6],Vals[4],Vals[5]);
|
|
|
+Vals[2]+=(rotr(Vals[7],6)^rotr(Vals[7],11)^rotr(Vals[7],25));
|
|
|
+Vals[2]+=ch(Vals[7],Vals[0],Vals[1]);
|
|
|
+Vals[2]+=K[5];
|
|
|
+Vals[2]+=W[5];
|
|
|
+Vals[6]+=Vals[2];
|
|
|
+Vals[2]+=(rotr(Vals[3],2)^rotr(Vals[3],13)^rotr(Vals[3],22));
|
|
|
+Vals[1]+=(rotr(Vals[6],6)^rotr(Vals[6],11)^rotr(Vals[6],25));
|
|
|
+Vals[1]+=ch(Vals[6],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=K[6];
|
|
|
+Vals[1]+=W[6];
|
|
|
+Vals[2]+=Ma(Vals[5],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=Vals[1];
|
|
|
+Vals[1]+=(rotr(Vals[2],2)^rotr(Vals[2],13)^rotr(Vals[2],22));
|
|
|
+Vals[1]+=Ma(Vals[4],Vals[2],Vals[3]);
|
|
|
+Vals[0]+=(rotr(Vals[5],6)^rotr(Vals[5],11)^rotr(Vals[5],25));
|
|
|
+Vals[0]+=ch(Vals[5],Vals[6],Vals[7]);
|
|
|
+Vals[0]+=K[7];
|
|
|
+Vals[0]+=W[7];
|
|
|
+Vals[4]+=Vals[0];
|
|
|
+Vals[0]+=(rotr(Vals[1],2)^rotr(Vals[1],13)^rotr(Vals[1],22));
|
|
|
+Vals[7]+=(rotr(Vals[4],6)^rotr(Vals[4],11)^rotr(Vals[4],25));
|
|
|
+Vals[7]+=ch(Vals[4],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=0x15807AA98;
|
|
|
+Vals[0]+=Ma(Vals[3],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=Vals[7];
|
|
|
+Vals[7]+=(rotr(Vals[0],2)^rotr(Vals[0],13)^rotr(Vals[0],22));
|
|
|
+Vals[7]+=Ma(Vals[2],Vals[0],Vals[1]);
|
|
|
+Vals[6]+=(rotr(Vals[3],6)^rotr(Vals[3],11)^rotr(Vals[3],25));
|
|
|
+Vals[6]+=ch(Vals[3],Vals[4],Vals[5]);
|
|
|
+Vals[6]+=K[9];
|
|
|
+Vals[2]+=Vals[6];
|
|
|
+Vals[6]+=(rotr(Vals[7],2)^rotr(Vals[7],13)^rotr(Vals[7],22));
|
|
|
+Vals[6]+=Ma(Vals[1],Vals[7],Vals[0]);
|
|
|
+Vals[5]+=(rotr(Vals[2],6)^rotr(Vals[2],11)^rotr(Vals[2],25));
|
|
|
+Vals[5]+=ch(Vals[2],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=K[10];
|
|
|
+Vals[1]+=Vals[5];
|
|
|
+Vals[5]+=(rotr(Vals[6],2)^rotr(Vals[6],13)^rotr(Vals[6],22));
|
|
|
+Vals[5]+=Ma(Vals[0],Vals[6],Vals[7]);
|
|
|
+Vals[4]+=(rotr(Vals[1],6)^rotr(Vals[1],11)^rotr(Vals[1],25));
|
|
|
+Vals[4]+=ch(Vals[1],Vals[2],Vals[3]);
|
|
|
+Vals[4]+=K[11];
|
|
|
+Vals[0]+=Vals[4];
|
|
|
+Vals[4]+=(rotr(Vals[5],2)^rotr(Vals[5],13)^rotr(Vals[5],22));
|
|
|
+Vals[4]+=Ma(Vals[7],Vals[5],Vals[6]);
|
|
|
+Vals[3]+=(rotr(Vals[0],6)^rotr(Vals[0],11)^rotr(Vals[0],25));
|
|
|
+Vals[3]+=ch(Vals[0],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=K[12];
|
|
|
+Vals[7]+=Vals[3];
|
|
|
+Vals[3]+=(rotr(Vals[4],2)^rotr(Vals[4],13)^rotr(Vals[4],22));
|
|
|
+Vals[3]+=Ma(Vals[6],Vals[4],Vals[5]);
|
|
|
+Vals[2]+=(rotr(Vals[7],6)^rotr(Vals[7],11)^rotr(Vals[7],25));
|
|
|
+Vals[2]+=ch(Vals[7],Vals[0],Vals[1]);
|
|
|
+Vals[2]+=K[13];
|
|
|
+Vals[6]+=Vals[2];
|
|
|
+Vals[2]+=(rotr(Vals[3],2)^rotr(Vals[3],13)^rotr(Vals[3],22));
|
|
|
+Vals[2]+=Ma(Vals[5],Vals[3],Vals[4]);
|
|
|
+Vals[1]+=(rotr(Vals[6],6)^rotr(Vals[6],11)^rotr(Vals[6],25));
|
|
|
+Vals[1]+=ch(Vals[6],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=K[14];
|
|
|
+Vals[5]+=Vals[1];
|
|
|
+Vals[1]+=(rotr(Vals[2],2)^rotr(Vals[2],13)^rotr(Vals[2],22));
|
|
|
+Vals[1]+=Ma(Vals[4],Vals[2],Vals[3]);
|
|
|
+Vals[0]+=(rotr(Vals[5],6)^rotr(Vals[5],11)^rotr(Vals[5],25));
|
|
|
+Vals[0]+=ch(Vals[5],Vals[6],Vals[7]);
|
|
|
+Vals[0]+=0xC19BF274;
|
|
|
+Vals[4]+=Vals[0];
|
|
|
+Vals[0]+=(rotr(Vals[1],2)^rotr(Vals[1],13)^rotr(Vals[1],22));
|
|
|
+Vals[7]+=(rotr(Vals[4],6)^rotr(Vals[4],11)^rotr(Vals[4],25));
|
|
|
+Vals[7]+=ch(Vals[4],Vals[5],Vals[6]);
|
|
|
W[0]+=(rotr(W[1],7)^rotr(W[1],18)^(W[1]>>3U));
|
|
|
-W[23]+=K[16];
|
|
|
-W[23]+=W[0];
|
|
|
-W[16]+=Ma(W[19],W[17],W[18]);
|
|
|
-W[19]+=W[23];
|
|
|
-W[23]+=(rotr(W[16],2)^rotr(W[16],13)^rotr(W[16],22));
|
|
|
-W[23]+=Ma(W[18],W[16],W[17]);
|
|
|
+Vals[7]+=K[16];
|
|
|
+Vals[7]+=W[0];
|
|
|
+Vals[0]+=Ma(Vals[3],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=Vals[7];
|
|
|
+Vals[7]+=(rotr(Vals[0],2)^rotr(Vals[0],13)^rotr(Vals[0],22));
|
|
|
+Vals[7]+=Ma(Vals[2],Vals[0],Vals[1]);
|
|
|
W[1]+=(rotr(W[2],7)^rotr(W[2],18)^(W[2]>>3U));
|
|
|
W[1]+=0x00a00000U;
|
|
|
-W[22]+=(rotr(W[19],6)^rotr(W[19],11)^rotr(W[19],25));
|
|
|
-W[22]+=ch(W[19],W[20],W[21]);
|
|
|
-W[22]+=K[17];
|
|
|
-W[22]+=W[1];
|
|
|
-W[18]+=W[22];
|
|
|
-W[22]+=(rotr(W[23],2)^rotr(W[23],13)^rotr(W[23],22));
|
|
|
+Vals[6]+=(rotr(Vals[3],6)^rotr(Vals[3],11)^rotr(Vals[3],25));
|
|
|
+Vals[6]+=ch(Vals[3],Vals[4],Vals[5]);
|
|
|
+Vals[6]+=K[17];
|
|
|
+Vals[6]+=W[1];
|
|
|
+Vals[2]+=Vals[6];
|
|
|
+Vals[6]+=(rotr(Vals[7],2)^rotr(Vals[7],13)^rotr(Vals[7],22));
|
|
|
W[2]+=(rotr(W[3],7)^rotr(W[3],18)^(W[3]>>3U));
|
|
|
W[2]+=(rotr(W[0],17)^rotr(W[0],19)^(W[0]>>10U));
|
|
|
-W[21]+=(rotr(W[18],6)^rotr(W[18],11)^rotr(W[18],25));
|
|
|
-W[21]+=ch(W[18],W[19],W[20]);
|
|
|
-W[21]+=K[18];
|
|
|
-W[21]+=W[2];
|
|
|
-W[22]+=Ma(W[17],W[23],W[16]);
|
|
|
-W[17]+=W[21];
|
|
|
-W[21]+=(rotr(W[22],2)^rotr(W[22],13)^rotr(W[22],22));
|
|
|
-W[21]+=Ma(W[16],W[22],W[23]);
|
|
|
+Vals[5]+=(rotr(Vals[2],6)^rotr(Vals[2],11)^rotr(Vals[2],25));
|
|
|
+Vals[5]+=ch(Vals[2],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=K[18];
|
|
|
+Vals[5]+=W[2];
|
|
|
+Vals[6]+=Ma(Vals[1],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=Vals[5];
|
|
|
+Vals[5]+=(rotr(Vals[6],2)^rotr(Vals[6],13)^rotr(Vals[6],22));
|
|
|
+Vals[5]+=Ma(Vals[0],Vals[6],Vals[7]);
|
|
|
W[3]+=(rotr(W[4],7)^rotr(W[4],18)^(W[4]>>3U));
|
|
|
W[3]+=(rotr(W[1],17)^rotr(W[1],19)^(W[1]>>10U));
|
|
|
-W[20]+=(rotr(W[17],6)^rotr(W[17],11)^rotr(W[17],25));
|
|
|
-W[20]+=ch(W[17],W[18],W[19]);
|
|
|
-W[20]+=K[19];
|
|
|
-W[20]+=W[3];
|
|
|
-W[16]+=W[20];
|
|
|
-W[20]+=(rotr(W[21],2)^rotr(W[21],13)^rotr(W[21],22));
|
|
|
+Vals[4]+=(rotr(Vals[1],6)^rotr(Vals[1],11)^rotr(Vals[1],25));
|
|
|
+Vals[4]+=ch(Vals[1],Vals[2],Vals[3]);
|
|
|
+Vals[4]+=K[19];
|
|
|
+Vals[4]+=W[3];
|
|
|
+Vals[0]+=Vals[4];
|
|
|
+Vals[4]+=(rotr(Vals[5],2)^rotr(Vals[5],13)^rotr(Vals[5],22));
|
|
|
W[4]+=(rotr(W[5],7)^rotr(W[5],18)^(W[5]>>3U));
|
|
|
W[4]+=(rotr(W[2],17)^rotr(W[2],19)^(W[2]>>10U));
|
|
|
-W[19]+=(rotr(W[16],6)^rotr(W[16],11)^rotr(W[16],25));
|
|
|
-W[19]+=ch(W[16],W[17],W[18]);
|
|
|
-W[19]+=K[20];
|
|
|
-W[19]+=W[4];
|
|
|
-W[20]+=Ma(W[23],W[21],W[22]);
|
|
|
-W[23]+=W[19];
|
|
|
-W[19]+=(rotr(W[20],2)^rotr(W[20],13)^rotr(W[20],22));
|
|
|
-W[19]+=Ma(W[22],W[20],W[21]);
|
|
|
+Vals[3]+=(rotr(Vals[0],6)^rotr(Vals[0],11)^rotr(Vals[0],25));
|
|
|
+Vals[3]+=ch(Vals[0],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=K[20];
|
|
|
+Vals[3]+=W[4];
|
|
|
+Vals[4]+=Ma(Vals[7],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=Vals[3];
|
|
|
+Vals[3]+=(rotr(Vals[4],2)^rotr(Vals[4],13)^rotr(Vals[4],22));
|
|
|
+Vals[3]+=Ma(Vals[6],Vals[4],Vals[5]);
|
|
|
W[5]+=(rotr(W[6],7)^rotr(W[6],18)^(W[6]>>3U));
|
|
|
W[5]+=(rotr(W[3],17)^rotr(W[3],19)^(W[3]>>10U));
|
|
|
-W[18]+=(rotr(W[23],6)^rotr(W[23],11)^rotr(W[23],25));
|
|
|
-W[18]+=ch(W[23],W[16],W[17]);
|
|
|
-W[18]+=K[21];
|
|
|
-W[18]+=W[5];
|
|
|
-W[22]+=W[18];
|
|
|
-W[18]+=(rotr(W[19],2)^rotr(W[19],13)^rotr(W[19],22));
|
|
|
+Vals[2]+=(rotr(Vals[7],6)^rotr(Vals[7],11)^rotr(Vals[7],25));
|
|
|
+Vals[2]+=ch(Vals[7],Vals[0],Vals[1]);
|
|
|
+Vals[2]+=K[21];
|
|
|
+Vals[2]+=W[5];
|
|
|
+Vals[6]+=Vals[2];
|
|
|
+Vals[2]+=(rotr(Vals[3],2)^rotr(Vals[3],13)^rotr(Vals[3],22));
|
|
|
W[6]+=(rotr(W[7],7)^rotr(W[7],18)^(W[7]>>3U));
|
|
|
W[6]+=0x00000100U;
|
|
|
-W[17]+=(rotr(W[22],6)^rotr(W[22],11)^rotr(W[22],25));
|
|
|
-W[17]+=ch(W[22],W[23],W[16]);
|
|
|
+Vals[1]+=(rotr(Vals[6],6)^rotr(Vals[6],11)^rotr(Vals[6],25));
|
|
|
+Vals[1]+=ch(Vals[6],Vals[7],Vals[0]);
|
|
|
W[6]+=(rotr(W[4],17)^rotr(W[4],19)^(W[4]>>10U));
|
|
|
-W[17]+=K[22];
|
|
|
-W[17]+=W[6];
|
|
|
-W[18]+=Ma(W[21],W[19],W[20]);
|
|
|
-W[21]+=W[17];
|
|
|
-W[17]+=(rotr(W[18],2)^rotr(W[18],13)^rotr(W[18],22));
|
|
|
-W[17]+=Ma(W[20],W[18],W[19]);
|
|
|
+Vals[1]+=K[22];
|
|
|
+Vals[1]+=W[6];
|
|
|
+Vals[2]+=Ma(Vals[5],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=Vals[1];
|
|
|
+Vals[1]+=(rotr(Vals[2],2)^rotr(Vals[2],13)^rotr(Vals[2],22));
|
|
|
+Vals[1]+=Ma(Vals[4],Vals[2],Vals[3]);
|
|
|
W[7]+=0x11002000U;
|
|
|
W[7]+=W[0];
|
|
|
-W[16]+=(rotr(W[21],6)^rotr(W[21],11)^rotr(W[21],25));
|
|
|
-W[16]+=ch(W[21],W[22],W[23]);
|
|
|
-W[16]+=K[23];
|
|
|
+Vals[0]+=(rotr(Vals[5],6)^rotr(Vals[5],11)^rotr(Vals[5],25));
|
|
|
+Vals[0]+=ch(Vals[5],Vals[6],Vals[7]);
|
|
|
+Vals[0]+=K[23];
|
|
|
W[7]+=(rotr(W[5],17)^rotr(W[5],19)^(W[5]>>10U));
|
|
|
-W[16]+=W[7];
|
|
|
-W[20]+=W[16];
|
|
|
-W[16]+=(rotr(W[17],2)^rotr(W[17],13)^rotr(W[17],22));
|
|
|
+Vals[0]+=W[7];
|
|
|
+Vals[4]+=Vals[0];
|
|
|
+Vals[0]+=(rotr(Vals[1],2)^rotr(Vals[1],13)^rotr(Vals[1],22));
|
|
|
|
|
|
W[8]=0x80000000;
|
|
|
W[8]+=W[1];
|
|
|
W[8]+=(rotr(W[6],17)^rotr(W[6],19)^(W[6]>>10U));
|
|
|
-W[23]+=W[8];
|
|
|
-W[23]+=(rotr(W[20],6)^rotr(W[20],11)^rotr(W[20],25));
|
|
|
-W[23]+=ch(W[20],W[21],W[22]);
|
|
|
-W[23]+=K[24];
|
|
|
-W[16]+=Ma(W[19],W[17],W[18]);
|
|
|
-W[19]+=W[23];
|
|
|
-W[23]+=(rotr(W[16],2)^rotr(W[16],13)^rotr(W[16],22));
|
|
|
-W[23]+=Ma(W[18],W[16],W[17]);
|
|
|
+Vals[7]+=W[8];
|
|
|
+Vals[7]+=(rotr(Vals[4],6)^rotr(Vals[4],11)^rotr(Vals[4],25));
|
|
|
+Vals[7]+=ch(Vals[4],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=K[24];
|
|
|
+Vals[0]+=Ma(Vals[3],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=Vals[7];
|
|
|
+Vals[7]+=(rotr(Vals[0],2)^rotr(Vals[0],13)^rotr(Vals[0],22));
|
|
|
+Vals[7]+=Ma(Vals[2],Vals[0],Vals[1]);
|
|
|
|
|
|
W[9]=W[2];
|
|
|
W[9]+=(rotr(W[7],17)^rotr(W[7],19)^(W[7]>>10U));
|
|
|
-W[22]+=W[9];
|
|
|
-W[22]+=(rotr(W[19],6)^rotr(W[19],11)^rotr(W[19],25));
|
|
|
-W[22]+=ch(W[19],W[20],W[21]);
|
|
|
-W[22]+=K[25];
|
|
|
-W[18]+=W[22];
|
|
|
-W[22]+=(rotr(W[23],2)^rotr(W[23],13)^rotr(W[23],22));
|
|
|
+Vals[6]+=W[9];
|
|
|
+Vals[6]+=(rotr(Vals[3],6)^rotr(Vals[3],11)^rotr(Vals[3],25));
|
|
|
+Vals[6]+=ch(Vals[3],Vals[4],Vals[5]);
|
|
|
+Vals[6]+=K[25];
|
|
|
+Vals[2]+=Vals[6];
|
|
|
+Vals[6]+=(rotr(Vals[7],2)^rotr(Vals[7],13)^rotr(Vals[7],22));
|
|
|
|
|
|
W[10]=W[3];
|
|
|
W[10]+=(rotr(W[8],17)^rotr(W[8],19)^(W[8]>>10U));
|
|
|
-W[21]+=W[10];
|
|
|
-W[21]+=(rotr(W[18],6)^rotr(W[18],11)^rotr(W[18],25));
|
|
|
-W[21]+=ch(W[18],W[19],W[20]);
|
|
|
-W[21]+=K[26];
|
|
|
-W[22]+=Ma(W[17],W[23],W[16]);
|
|
|
-W[17]+=W[21];
|
|
|
-W[21]+=(rotr(W[22],2)^rotr(W[22],13)^rotr(W[22],22));
|
|
|
-W[21]+=Ma(W[16],W[22],W[23]);
|
|
|
+Vals[5]+=W[10];
|
|
|
+Vals[5]+=(rotr(Vals[2],6)^rotr(Vals[2],11)^rotr(Vals[2],25));
|
|
|
+Vals[5]+=ch(Vals[2],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=K[26];
|
|
|
+Vals[6]+=Ma(Vals[1],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=Vals[5];
|
|
|
+Vals[5]+=(rotr(Vals[6],2)^rotr(Vals[6],13)^rotr(Vals[6],22));
|
|
|
+Vals[5]+=Ma(Vals[0],Vals[6],Vals[7]);
|
|
|
|
|
|
W[11]=W[4];
|
|
|
W[11]+=(rotr(W[9],17)^rotr(W[9],19)^(W[9]>>10U));
|
|
|
-W[20]+=W[11];
|
|
|
-W[20]+=(rotr(W[17],6)^rotr(W[17],11)^rotr(W[17],25));
|
|
|
-W[20]+=ch(W[17],W[18],W[19]);
|
|
|
-W[20]+=K[27];
|
|
|
-W[16]+=W[20];
|
|
|
-W[20]+=(rotr(W[21],2)^rotr(W[21],13)^rotr(W[21],22));
|
|
|
+Vals[4]+=W[11];
|
|
|
+Vals[4]+=(rotr(Vals[1],6)^rotr(Vals[1],11)^rotr(Vals[1],25));
|
|
|
+Vals[4]+=ch(Vals[1],Vals[2],Vals[3]);
|
|
|
+Vals[4]+=K[27];
|
|
|
+Vals[0]+=Vals[4];
|
|
|
+Vals[4]+=(rotr(Vals[5],2)^rotr(Vals[5],13)^rotr(Vals[5],22));
|
|
|
|
|
|
W[12]=W[5];
|
|
|
W[12]+=(rotr(W[10],17)^rotr(W[10],19)^(W[10]>>10U));
|
|
|
-W[19]+=W[12];
|
|
|
-W[19]+=(rotr(W[16],6)^rotr(W[16],11)^rotr(W[16],25));
|
|
|
-W[19]+=ch(W[16],W[17],W[18]);
|
|
|
-W[19]+=K[28];
|
|
|
-W[20]+=Ma(W[23],W[21],W[22]);
|
|
|
-W[23]+=W[19];
|
|
|
-W[19]+=(rotr(W[20],2)^rotr(W[20],13)^rotr(W[20],22));
|
|
|
-W[19]+=Ma(W[22],W[20],W[21]);
|
|
|
+Vals[3]+=W[12];
|
|
|
+Vals[3]+=(rotr(Vals[0],6)^rotr(Vals[0],11)^rotr(Vals[0],25));
|
|
|
+Vals[3]+=ch(Vals[0],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=K[28];
|
|
|
+Vals[4]+=Ma(Vals[7],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=Vals[3];
|
|
|
+Vals[3]+=(rotr(Vals[4],2)^rotr(Vals[4],13)^rotr(Vals[4],22));
|
|
|
+Vals[3]+=Ma(Vals[6],Vals[4],Vals[5]);
|
|
|
|
|
|
W[13]=W[6];
|
|
|
W[13]+=(rotr(W[11],17)^rotr(W[11],19)^(W[11]>>10U));
|
|
|
-W[18]+=W[13];
|
|
|
-W[18]+=(rotr(W[23],6)^rotr(W[23],11)^rotr(W[23],25));
|
|
|
-W[18]+=ch(W[23],W[16],W[17]);
|
|
|
-W[18]+=K[29];
|
|
|
-W[22]+=W[18];
|
|
|
-W[18]+=(rotr(W[19],2)^rotr(W[19],13)^rotr(W[19],22));
|
|
|
+Vals[2]+=W[13];
|
|
|
+Vals[2]+=(rotr(Vals[7],6)^rotr(Vals[7],11)^rotr(Vals[7],25));
|
|
|
+Vals[2]+=ch(Vals[7],Vals[0],Vals[1]);
|
|
|
+Vals[2]+=K[29];
|
|
|
+Vals[6]+=Vals[2];
|
|
|
+Vals[2]+=(rotr(Vals[3],2)^rotr(Vals[3],13)^rotr(Vals[3],22));
|
|
|
|
|
|
W[14]=0x00400022U;
|
|
|
W[14]+=W[7];
|
|
|
W[14]+=(rotr(W[12],17)^rotr(W[12],19)^(W[12]>>10U));
|
|
|
-W[17]+=W[14];
|
|
|
-W[17]+=(rotr(W[22],6)^rotr(W[22],11)^rotr(W[22],25));
|
|
|
-W[17]+=ch(W[22],W[23],W[16]);
|
|
|
-W[17]+=K[30];
|
|
|
-W[18]+=Ma(W[21],W[19],W[20]);
|
|
|
-W[21]+=W[17];
|
|
|
-W[17]+=(rotr(W[18],2)^rotr(W[18],13)^rotr(W[18],22));
|
|
|
-W[17]+=Ma(W[20],W[18],W[19]);
|
|
|
+Vals[1]+=W[14];
|
|
|
+Vals[1]+=(rotr(Vals[6],6)^rotr(Vals[6],11)^rotr(Vals[6],25));
|
|
|
+Vals[1]+=ch(Vals[6],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=K[30];
|
|
|
+Vals[2]+=Ma(Vals[5],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=Vals[1];
|
|
|
+Vals[1]+=(rotr(Vals[2],2)^rotr(Vals[2],13)^rotr(Vals[2],22));
|
|
|
+Vals[1]+=Ma(Vals[4],Vals[2],Vals[3]);
|
|
|
|
|
|
W[15]=0x00000100U;
|
|
|
W[15]+=(rotr(W[0],7)^rotr(W[0],18)^(W[0]>>3U));
|
|
|
W[15]+=W[8];
|
|
|
W[15]+=(rotr(W[13],17)^rotr(W[13],19)^(W[13]>>10U));
|
|
|
-W[16]+=W[15];
|
|
|
-W[16]+=(rotr(W[21],6)^rotr(W[21],11)^rotr(W[21],25));
|
|
|
-W[16]+=ch(W[21],W[22],W[23]);
|
|
|
-W[16]+=K[31];
|
|
|
-W[20]+=W[16];
|
|
|
-W[16]+=(rotr(W[17],2)^rotr(W[17],13)^rotr(W[17],22));
|
|
|
+Vals[0]+=W[15];
|
|
|
+Vals[0]+=(rotr(Vals[5],6)^rotr(Vals[5],11)^rotr(Vals[5],25));
|
|
|
+Vals[0]+=ch(Vals[5],Vals[6],Vals[7]);
|
|
|
+Vals[0]+=K[31];
|
|
|
+Vals[4]+=Vals[0];
|
|
|
+Vals[0]+=(rotr(Vals[1],2)^rotr(Vals[1],13)^rotr(Vals[1],22));
|
|
|
|
|
|
W[0]+=(rotr(W[1],7)^rotr(W[1],18)^(W[1]>>3U));
|
|
|
W[0]+=W[9];
|
|
|
W[0]+=(rotr(W[14],17)^rotr(W[14],19)^(W[14]>>10U));
|
|
|
-W[23]+=W[0];
|
|
|
-W[23]+=(rotr(W[20],6)^rotr(W[20],11)^rotr(W[20],25));
|
|
|
-W[23]+=ch(W[20],W[21],W[22]);
|
|
|
-W[23]+=K[32];
|
|
|
-W[16]+=Ma(W[19],W[17],W[18]);
|
|
|
-W[19]+=W[23];
|
|
|
-W[23]+=(rotr(W[16],2)^rotr(W[16],13)^rotr(W[16],22));
|
|
|
-W[23]+=Ma(W[18],W[16],W[17]);
|
|
|
+Vals[7]+=W[0];
|
|
|
+Vals[7]+=(rotr(Vals[4],6)^rotr(Vals[4],11)^rotr(Vals[4],25));
|
|
|
+Vals[7]+=ch(Vals[4],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=K[32];
|
|
|
+Vals[0]+=Ma(Vals[3],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=Vals[7];
|
|
|
+Vals[7]+=(rotr(Vals[0],2)^rotr(Vals[0],13)^rotr(Vals[0],22));
|
|
|
+Vals[7]+=Ma(Vals[2],Vals[0],Vals[1]);
|
|
|
|
|
|
W[1]+=(rotr(W[2],7)^rotr(W[2],18)^(W[2]>>3U));
|
|
|
W[1]+=W[10];
|
|
|
W[1]+=(rotr(W[15],17)^rotr(W[15],19)^(W[15]>>10U));
|
|
|
-W[22]+=W[1];
|
|
|
-W[22]+=(rotr(W[19],6)^rotr(W[19],11)^rotr(W[19],25));
|
|
|
-W[22]+=ch(W[19],W[20],W[21]);
|
|
|
-W[22]+=K[33];
|
|
|
-W[18]+=W[22];
|
|
|
-W[22]+=(rotr(W[23],2)^rotr(W[23],13)^rotr(W[23],22));
|
|
|
+Vals[6]+=W[1];
|
|
|
+Vals[6]+=(rotr(Vals[3],6)^rotr(Vals[3],11)^rotr(Vals[3],25));
|
|
|
+Vals[6]+=ch(Vals[3],Vals[4],Vals[5]);
|
|
|
+Vals[6]+=K[33];
|
|
|
+Vals[2]+=Vals[6];
|
|
|
+Vals[6]+=(rotr(Vals[7],2)^rotr(Vals[7],13)^rotr(Vals[7],22));
|
|
|
|
|
|
W[2]+=(rotr(W[3],7)^rotr(W[3],18)^(W[3]>>3U));
|
|
|
W[2]+=W[11];
|
|
|
W[2]+=(rotr(W[0],17)^rotr(W[0],19)^(W[0]>>10U));
|
|
|
-W[21]+=W[2];
|
|
|
-W[21]+=(rotr(W[18],6)^rotr(W[18],11)^rotr(W[18],25));
|
|
|
-W[21]+=ch(W[18],W[19],W[20]);
|
|
|
-W[21]+=K[34];
|
|
|
-W[22]+=Ma(W[17],W[23],W[16]);
|
|
|
-W[17]+=W[21];
|
|
|
-W[21]+=(rotr(W[22],2)^rotr(W[22],13)^rotr(W[22],22));
|
|
|
-W[21]+=Ma(W[16],W[22],W[23]);
|
|
|
+Vals[5]+=W[2];
|
|
|
+Vals[5]+=(rotr(Vals[2],6)^rotr(Vals[2],11)^rotr(Vals[2],25));
|
|
|
+Vals[5]+=ch(Vals[2],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=K[34];
|
|
|
+Vals[6]+=Ma(Vals[1],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=Vals[5];
|
|
|
+Vals[5]+=(rotr(Vals[6],2)^rotr(Vals[6],13)^rotr(Vals[6],22));
|
|
|
+Vals[5]+=Ma(Vals[0],Vals[6],Vals[7]);
|
|
|
|
|
|
W[3]+=(rotr(W[4],7)^rotr(W[4],18)^(W[4]>>3U));
|
|
|
W[3]+=W[12];
|
|
|
W[3]+=(rotr(W[1],17)^rotr(W[1],19)^(W[1]>>10U));
|
|
|
-W[20]+=W[3];
|
|
|
-W[20]+=(rotr(W[17],6)^rotr(W[17],11)^rotr(W[17],25));
|
|
|
-W[20]+=ch(W[17],W[18],W[19]);
|
|
|
-W[20]+=K[35];
|
|
|
-W[16]+=W[20];
|
|
|
-W[20]+=(rotr(W[21],2)^rotr(W[21],13)^rotr(W[21],22));
|
|
|
+Vals[4]+=W[3];
|
|
|
+Vals[4]+=(rotr(Vals[1],6)^rotr(Vals[1],11)^rotr(Vals[1],25));
|
|
|
+Vals[4]+=ch(Vals[1],Vals[2],Vals[3]);
|
|
|
+Vals[4]+=K[35];
|
|
|
+Vals[0]+=Vals[4];
|
|
|
+Vals[4]+=(rotr(Vals[5],2)^rotr(Vals[5],13)^rotr(Vals[5],22));
|
|
|
|
|
|
W[4]+=(rotr(W[5],7)^rotr(W[5],18)^(W[5]>>3U));
|
|
|
W[4]+=W[13];
|
|
|
W[4]+=(rotr(W[2],17)^rotr(W[2],19)^(W[2]>>10U));
|
|
|
-W[19]+=W[4];
|
|
|
-W[19]+=(rotr(W[16],6)^rotr(W[16],11)^rotr(W[16],25));
|
|
|
-W[19]+=ch(W[16],W[17],W[18]);
|
|
|
-W[19]+=K[36];
|
|
|
-W[20]+=Ma(W[23],W[21],W[22]);
|
|
|
-W[23]+=W[19];
|
|
|
-W[19]+=(rotr(W[20],2)^rotr(W[20],13)^rotr(W[20],22));
|
|
|
-W[19]+=Ma(W[22],W[20],W[21]);
|
|
|
+Vals[3]+=W[4];
|
|
|
+Vals[3]+=(rotr(Vals[0],6)^rotr(Vals[0],11)^rotr(Vals[0],25));
|
|
|
+Vals[3]+=ch(Vals[0],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=K[36];
|
|
|
+Vals[4]+=Ma(Vals[7],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=Vals[3];
|
|
|
+Vals[3]+=(rotr(Vals[4],2)^rotr(Vals[4],13)^rotr(Vals[4],22));
|
|
|
+Vals[3]+=Ma(Vals[6],Vals[4],Vals[5]);
|
|
|
|
|
|
W[5]+=(rotr(W[6],7)^rotr(W[6],18)^(W[6]>>3U));
|
|
|
W[5]+=W[14];
|
|
|
W[5]+=(rotr(W[3],17)^rotr(W[3],19)^(W[3]>>10U));
|
|
|
-W[18]+=W[5];
|
|
|
-W[18]+=(rotr(W[23],6)^rotr(W[23],11)^rotr(W[23],25));
|
|
|
-W[18]+=ch(W[23],W[16],W[17]);
|
|
|
-W[18]+=K[37];
|
|
|
-W[22]+=W[18];
|
|
|
-W[18]+=(rotr(W[19],2)^rotr(W[19],13)^rotr(W[19],22));
|
|
|
+Vals[2]+=W[5];
|
|
|
+Vals[2]+=(rotr(Vals[7],6)^rotr(Vals[7],11)^rotr(Vals[7],25));
|
|
|
+Vals[2]+=ch(Vals[7],Vals[0],Vals[1]);
|
|
|
+Vals[2]+=K[37];
|
|
|
+Vals[6]+=Vals[2];
|
|
|
+Vals[2]+=(rotr(Vals[3],2)^rotr(Vals[3],13)^rotr(Vals[3],22));
|
|
|
|
|
|
W[6]+=(rotr(W[7],7)^rotr(W[7],18)^(W[7]>>3U));
|
|
|
W[6]+=W[15];
|
|
|
W[6]+=(rotr(W[4],17)^rotr(W[4],19)^(W[4]>>10U));
|
|
|
-W[17]+=W[6];
|
|
|
-W[17]+=(rotr(W[22],6)^rotr(W[22],11)^rotr(W[22],25));
|
|
|
-W[17]+=ch(W[22],W[23],W[16]);
|
|
|
-W[17]+=K[38];
|
|
|
-W[18]+=Ma(W[21],W[19],W[20]);
|
|
|
-W[21]+=W[17];
|
|
|
-W[17]+=(rotr(W[18],2)^rotr(W[18],13)^rotr(W[18],22));
|
|
|
-W[17]+=Ma(W[20],W[18],W[19]);
|
|
|
+Vals[1]+=W[6];
|
|
|
+Vals[1]+=(rotr(Vals[6],6)^rotr(Vals[6],11)^rotr(Vals[6],25));
|
|
|
+Vals[1]+=ch(Vals[6],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=K[38];
|
|
|
+Vals[2]+=Ma(Vals[5],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=Vals[1];
|
|
|
+Vals[1]+=(rotr(Vals[2],2)^rotr(Vals[2],13)^rotr(Vals[2],22));
|
|
|
+Vals[1]+=Ma(Vals[4],Vals[2],Vals[3]);
|
|
|
|
|
|
W[7]+=(rotr(W[8],7)^rotr(W[8],18)^(W[8]>>3U));
|
|
|
W[7]+=W[0];
|
|
|
W[7]+=(rotr(W[5],17)^rotr(W[5],19)^(W[5]>>10U));
|
|
|
-W[16]+=W[7];
|
|
|
-W[16]+=(rotr(W[21],6)^rotr(W[21],11)^rotr(W[21],25));
|
|
|
-W[16]+=ch(W[21],W[22],W[23]);
|
|
|
-W[16]+=K[39];
|
|
|
-W[20]+=W[16];
|
|
|
-W[16]+=(rotr(W[17],2)^rotr(W[17],13)^rotr(W[17],22));
|
|
|
+Vals[0]+=W[7];
|
|
|
+Vals[0]+=(rotr(Vals[5],6)^rotr(Vals[5],11)^rotr(Vals[5],25));
|
|
|
+Vals[0]+=ch(Vals[5],Vals[6],Vals[7]);
|
|
|
+Vals[0]+=K[39];
|
|
|
+Vals[4]+=Vals[0];
|
|
|
+Vals[0]+=(rotr(Vals[1],2)^rotr(Vals[1],13)^rotr(Vals[1],22));
|
|
|
|
|
|
W[8]+=(rotr(W[9],7)^rotr(W[9],18)^(W[9]>>3U));
|
|
|
W[8]+=W[1];
|
|
|
W[8]+=(rotr(W[6],17)^rotr(W[6],19)^(W[6]>>10U));
|
|
|
-W[23]+=W[8];
|
|
|
-W[23]+=(rotr(W[20],6)^rotr(W[20],11)^rotr(W[20],25));
|
|
|
-W[23]+=ch(W[20],W[21],W[22]);
|
|
|
-W[23]+=K[40];
|
|
|
-W[16]+=Ma(W[19],W[17],W[18]);
|
|
|
-W[19]+=W[23];
|
|
|
-W[23]+=(rotr(W[16],2)^rotr(W[16],13)^rotr(W[16],22));
|
|
|
-W[23]+=Ma(W[18],W[16],W[17]);
|
|
|
+Vals[7]+=W[8];
|
|
|
+Vals[7]+=(rotr(Vals[4],6)^rotr(Vals[4],11)^rotr(Vals[4],25));
|
|
|
+Vals[7]+=ch(Vals[4],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=K[40];
|
|
|
+Vals[0]+=Ma(Vals[3],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=Vals[7];
|
|
|
+Vals[7]+=(rotr(Vals[0],2)^rotr(Vals[0],13)^rotr(Vals[0],22));
|
|
|
+Vals[7]+=Ma(Vals[2],Vals[0],Vals[1]);
|
|
|
|
|
|
W[9]+=(rotr(W[10],7)^rotr(W[10],18)^(W[10]>>3U));
|
|
|
W[9]+=W[2];
|
|
|
W[9]+=(rotr(W[7],17)^rotr(W[7],19)^(W[7]>>10U));
|
|
|
-W[22]+=W[9];
|
|
|
-W[22]+=(rotr(W[19],6)^rotr(W[19],11)^rotr(W[19],25));
|
|
|
-W[22]+=ch(W[19],W[20],W[21]);
|
|
|
-W[22]+=K[41];
|
|
|
-W[18]+=W[22];
|
|
|
-W[22]+=(rotr(W[23],2)^rotr(W[23],13)^rotr(W[23],22));
|
|
|
+Vals[6]+=W[9];
|
|
|
+Vals[6]+=(rotr(Vals[3],6)^rotr(Vals[3],11)^rotr(Vals[3],25));
|
|
|
+Vals[6]+=ch(Vals[3],Vals[4],Vals[5]);
|
|
|
+Vals[6]+=K[41];
|
|
|
+Vals[2]+=Vals[6];
|
|
|
+Vals[6]+=(rotr(Vals[7],2)^rotr(Vals[7],13)^rotr(Vals[7],22));
|
|
|
|
|
|
W[10]+=(rotr(W[11],7)^rotr(W[11],18)^(W[11]>>3U));
|
|
|
W[10]+=W[3];
|
|
|
W[10]+=(rotr(W[8],17)^rotr(W[8],19)^(W[8]>>10U));
|
|
|
-W[21]+=W[10];
|
|
|
-W[21]+=(rotr(W[18],6)^rotr(W[18],11)^rotr(W[18],25));
|
|
|
-W[21]+=ch(W[18],W[19],W[20]);
|
|
|
-W[21]+=K[42];
|
|
|
-W[22]+=Ma(W[17],W[23],W[16]);
|
|
|
-W[17]+=W[21];
|
|
|
-W[21]+=(rotr(W[22],2)^rotr(W[22],13)^rotr(W[22],22));
|
|
|
-W[21]+=Ma(W[16],W[22],W[23]);
|
|
|
+Vals[5]+=W[10];
|
|
|
+Vals[5]+=(rotr(Vals[2],6)^rotr(Vals[2],11)^rotr(Vals[2],25));
|
|
|
+Vals[5]+=ch(Vals[2],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=K[42];
|
|
|
+Vals[6]+=Ma(Vals[1],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=Vals[5];
|
|
|
+Vals[5]+=(rotr(Vals[6],2)^rotr(Vals[6],13)^rotr(Vals[6],22));
|
|
|
+Vals[5]+=Ma(Vals[0],Vals[6],Vals[7]);
|
|
|
|
|
|
W[11]+=(rotr(W[12],7)^rotr(W[12],18)^(W[12]>>3U));
|
|
|
W[11]+=W[4];
|
|
|
W[11]+=(rotr(W[9],17)^rotr(W[9],19)^(W[9]>>10U));
|
|
|
-W[20]+=W[11];
|
|
|
-W[20]+=(rotr(W[17],6)^rotr(W[17],11)^rotr(W[17],25));
|
|
|
-W[20]+=ch(W[17],W[18],W[19]);
|
|
|
-W[20]+=K[43];
|
|
|
-W[16]+=W[20];
|
|
|
-W[20]+=(rotr(W[21],2)^rotr(W[21],13)^rotr(W[21],22));
|
|
|
+Vals[4]+=W[11];
|
|
|
+Vals[4]+=(rotr(Vals[1],6)^rotr(Vals[1],11)^rotr(Vals[1],25));
|
|
|
+Vals[4]+=ch(Vals[1],Vals[2],Vals[3]);
|
|
|
+Vals[4]+=K[43];
|
|
|
+Vals[0]+=Vals[4];
|
|
|
+Vals[4]+=(rotr(Vals[5],2)^rotr(Vals[5],13)^rotr(Vals[5],22));
|
|
|
|
|
|
W[12]+=(rotr(W[13],7)^rotr(W[13],18)^(W[13]>>3U));
|
|
|
W[12]+=W[5];
|
|
|
W[12]+=(rotr(W[10],17)^rotr(W[10],19)^(W[10]>>10U));
|
|
|
-W[19]+=W[12];
|
|
|
-W[19]+=(rotr(W[16],6)^rotr(W[16],11)^rotr(W[16],25));
|
|
|
-W[19]+=ch(W[16],W[17],W[18]);
|
|
|
-W[19]+=K[44];
|
|
|
-W[20]+=Ma(W[23],W[21],W[22]);
|
|
|
-W[23]+=W[19];
|
|
|
-W[19]+=(rotr(W[20],2)^rotr(W[20],13)^rotr(W[20],22));
|
|
|
-W[19]+=Ma(W[22],W[20],W[21]);
|
|
|
+Vals[3]+=W[12];
|
|
|
+Vals[3]+=(rotr(Vals[0],6)^rotr(Vals[0],11)^rotr(Vals[0],25));
|
|
|
+Vals[3]+=ch(Vals[0],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=K[44];
|
|
|
+Vals[4]+=Ma(Vals[7],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=Vals[3];
|
|
|
+Vals[3]+=(rotr(Vals[4],2)^rotr(Vals[4],13)^rotr(Vals[4],22));
|
|
|
+Vals[3]+=Ma(Vals[6],Vals[4],Vals[5]);
|
|
|
|
|
|
W[13]+=(rotr(W[14],7)^rotr(W[14],18)^(W[14]>>3U));
|
|
|
W[13]+=W[6];
|
|
|
W[13]+=(rotr(W[11],17)^rotr(W[11],19)^(W[11]>>10U));
|
|
|
-W[18]+=W[13];
|
|
|
-W[18]+=(rotr(W[23],6)^rotr(W[23],11)^rotr(W[23],25));
|
|
|
-W[18]+=ch(W[23],W[16],W[17]);
|
|
|
-W[18]+=K[45];
|
|
|
-W[22]+=W[18];
|
|
|
-W[18]+=(rotr(W[19],2)^rotr(W[19],13)^rotr(W[19],22));
|
|
|
+Vals[2]+=W[13];
|
|
|
+Vals[2]+=(rotr(Vals[7],6)^rotr(Vals[7],11)^rotr(Vals[7],25));
|
|
|
+Vals[2]+=ch(Vals[7],Vals[0],Vals[1]);
|
|
|
+Vals[2]+=K[45];
|
|
|
+Vals[6]+=Vals[2];
|
|
|
+Vals[2]+=(rotr(Vals[3],2)^rotr(Vals[3],13)^rotr(Vals[3],22));
|
|
|
|
|
|
W[14]+=(rotr(W[15],7)^rotr(W[15],18)^(W[15]>>3U));
|
|
|
W[14]+=W[7];
|
|
|
W[14]+=(rotr(W[12],17)^rotr(W[12],19)^(W[12]>>10U));
|
|
|
-W[17]+=W[14];
|
|
|
-W[17]+=(rotr(W[22],6)^rotr(W[22],11)^rotr(W[22],25));
|
|
|
-W[17]+=ch(W[22],W[23],W[16]);
|
|
|
-W[17]+=K[46];
|
|
|
-W[18]+=Ma(W[21],W[19],W[20]);
|
|
|
-W[21]+=W[17];
|
|
|
-W[17]+=(rotr(W[18],2)^rotr(W[18],13)^rotr(W[18],22));
|
|
|
-W[17]+=Ma(W[20],W[18],W[19]);
|
|
|
+Vals[1]+=W[14];
|
|
|
+Vals[1]+=(rotr(Vals[6],6)^rotr(Vals[6],11)^rotr(Vals[6],25));
|
|
|
+Vals[1]+=ch(Vals[6],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=K[46];
|
|
|
+Vals[2]+=Ma(Vals[5],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=Vals[1];
|
|
|
+Vals[1]+=(rotr(Vals[2],2)^rotr(Vals[2],13)^rotr(Vals[2],22));
|
|
|
+Vals[1]+=Ma(Vals[4],Vals[2],Vals[3]);
|
|
|
|
|
|
W[15]+=(rotr(W[0],7)^rotr(W[0],18)^(W[0]>>3U));
|
|
|
W[15]+=W[8];
|
|
|
W[15]+=(rotr(W[13],17)^rotr(W[13],19)^(W[13]>>10U));
|
|
|
-W[16]+=W[15];
|
|
|
-W[16]+=(rotr(W[21],6)^rotr(W[21],11)^rotr(W[21],25));
|
|
|
-W[16]+=ch(W[21],W[22],W[23]);
|
|
|
-W[16]+=K[47];
|
|
|
-W[20]+=W[16];
|
|
|
-W[16]+=(rotr(W[17],2)^rotr(W[17],13)^rotr(W[17],22));
|
|
|
+Vals[0]+=W[15];
|
|
|
+Vals[0]+=(rotr(Vals[5],6)^rotr(Vals[5],11)^rotr(Vals[5],25));
|
|
|
+Vals[0]+=ch(Vals[5],Vals[6],Vals[7]);
|
|
|
+Vals[0]+=K[47];
|
|
|
+Vals[4]+=Vals[0];
|
|
|
+Vals[0]+=(rotr(Vals[1],2)^rotr(Vals[1],13)^rotr(Vals[1],22));
|
|
|
|
|
|
W[0]+=(rotr(W[1],7)^rotr(W[1],18)^(W[1]>>3U));
|
|
|
W[0]+=W[9];
|
|
|
W[0]+=(rotr(W[14],17)^rotr(W[14],19)^(W[14]>>10U));
|
|
|
-W[23]+=W[0];
|
|
|
-W[23]+=(rotr(W[20],6)^rotr(W[20],11)^rotr(W[20],25));
|
|
|
-W[23]+=ch(W[20],W[21],W[22]);
|
|
|
-W[23]+=K[48];
|
|
|
-W[16]+=Ma(W[19],W[17],W[18]);
|
|
|
-W[19]+=W[23];
|
|
|
-W[23]+=(rotr(W[16],2)^rotr(W[16],13)^rotr(W[16],22));
|
|
|
-W[23]+=Ma(W[18],W[16],W[17]);
|
|
|
+Vals[7]+=W[0];
|
|
|
+Vals[7]+=(rotr(Vals[4],6)^rotr(Vals[4],11)^rotr(Vals[4],25));
|
|
|
+Vals[7]+=ch(Vals[4],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=K[48];
|
|
|
+Vals[0]+=Ma(Vals[3],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=Vals[7];
|
|
|
+Vals[7]+=(rotr(Vals[0],2)^rotr(Vals[0],13)^rotr(Vals[0],22));
|
|
|
+Vals[7]+=Ma(Vals[2],Vals[0],Vals[1]);
|
|
|
|
|
|
W[1]+=(rotr(W[2],7)^rotr(W[2],18)^(W[2]>>3U));
|
|
|
W[1]+=W[10];
|
|
|
W[1]+=(rotr(W[15],17)^rotr(W[15],19)^(W[15]>>10U));
|
|
|
-W[22]+=W[1];
|
|
|
-W[22]+=(rotr(W[19],6)^rotr(W[19],11)^rotr(W[19],25));
|
|
|
-W[22]+=ch(W[19],W[20],W[21]);
|
|
|
-W[22]+=K[49];
|
|
|
-W[18]+=W[22];
|
|
|
-W[22]+=(rotr(W[23],2)^rotr(W[23],13)^rotr(W[23],22));
|
|
|
+Vals[6]+=W[1];
|
|
|
+Vals[6]+=(rotr(Vals[3],6)^rotr(Vals[3],11)^rotr(Vals[3],25));
|
|
|
+Vals[6]+=ch(Vals[3],Vals[4],Vals[5]);
|
|
|
+Vals[6]+=K[49];
|
|
|
+Vals[2]+=Vals[6];
|
|
|
+Vals[6]+=(rotr(Vals[7],2)^rotr(Vals[7],13)^rotr(Vals[7],22));
|
|
|
|
|
|
W[2]+=(rotr(W[3],7)^rotr(W[3],18)^(W[3]>>3U));
|
|
|
W[2]+=W[11];
|
|
|
W[2]+=(rotr(W[0],17)^rotr(W[0],19)^(W[0]>>10U));
|
|
|
-W[21]+=W[2];
|
|
|
-W[21]+=(rotr(W[18],6)^rotr(W[18],11)^rotr(W[18],25));
|
|
|
-W[21]+=ch(W[18],W[19],W[20]);
|
|
|
-W[21]+=K[50];
|
|
|
-W[22]+=Ma(W[17],W[23],W[16]);
|
|
|
-W[17]+=W[21];
|
|
|
-W[21]+=(rotr(W[22],2)^rotr(W[22],13)^rotr(W[22],22));
|
|
|
-W[21]+=Ma(W[16],W[22],W[23]);
|
|
|
+Vals[5]+=W[2];
|
|
|
+Vals[5]+=(rotr(Vals[2],6)^rotr(Vals[2],11)^rotr(Vals[2],25));
|
|
|
+Vals[5]+=ch(Vals[2],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=K[50];
|
|
|
+Vals[6]+=Ma(Vals[1],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=Vals[5];
|
|
|
+Vals[5]+=(rotr(Vals[6],2)^rotr(Vals[6],13)^rotr(Vals[6],22));
|
|
|
+Vals[5]+=Ma(Vals[0],Vals[6],Vals[7]);
|
|
|
|
|
|
W[3]+=(rotr(W[4],7)^rotr(W[4],18)^(W[4]>>3U));
|
|
|
W[3]+=W[12];
|
|
|
W[3]+=(rotr(W[1],17)^rotr(W[1],19)^(W[1]>>10U));
|
|
|
-W[20]+=W[3];
|
|
|
-W[20]+=(rotr(W[17],6)^rotr(W[17],11)^rotr(W[17],25));
|
|
|
-W[20]+=ch(W[17],W[18],W[19]);
|
|
|
-W[20]+=K[51];
|
|
|
-W[16]+=W[20];
|
|
|
-W[20]+=(rotr(W[21],2)^rotr(W[21],13)^rotr(W[21],22));
|
|
|
+Vals[4]+=W[3];
|
|
|
+Vals[4]+=(rotr(Vals[1],6)^rotr(Vals[1],11)^rotr(Vals[1],25));
|
|
|
+Vals[4]+=ch(Vals[1],Vals[2],Vals[3]);
|
|
|
+Vals[4]+=K[51];
|
|
|
+Vals[0]+=Vals[4];
|
|
|
+Vals[4]+=(rotr(Vals[5],2)^rotr(Vals[5],13)^rotr(Vals[5],22));
|
|
|
|
|
|
W[4]+=(rotr(W[5],7)^rotr(W[5],18)^(W[5]>>3U));
|
|
|
W[4]+=W[13];
|
|
|
W[4]+=(rotr(W[2],17)^rotr(W[2],19)^(W[2]>>10U));
|
|
|
-W[19]+=W[4];
|
|
|
-W[19]+=(rotr(W[16],6)^rotr(W[16],11)^rotr(W[16],25));
|
|
|
-W[19]+=ch(W[16],W[17],W[18]);
|
|
|
-W[19]+=K[52];
|
|
|
-W[20]+=Ma(W[23],W[21],W[22]);
|
|
|
-W[23]+=W[19];
|
|
|
-W[19]+=(rotr(W[20],2)^rotr(W[20],13)^rotr(W[20],22));
|
|
|
-W[19]+=Ma(W[22],W[20],W[21]);
|
|
|
+Vals[3]+=W[4];
|
|
|
+Vals[3]+=(rotr(Vals[0],6)^rotr(Vals[0],11)^rotr(Vals[0],25));
|
|
|
+Vals[3]+=ch(Vals[0],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=K[52];
|
|
|
+Vals[4]+=Ma(Vals[7],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=Vals[3];
|
|
|
+Vals[3]+=(rotr(Vals[4],2)^rotr(Vals[4],13)^rotr(Vals[4],22));
|
|
|
+Vals[3]+=Ma(Vals[6],Vals[4],Vals[5]);
|
|
|
|
|
|
W[5]+=(rotr(W[6],7)^rotr(W[6],18)^(W[6]>>3U));
|
|
|
W[5]+=W[14];
|
|
|
W[5]+=(rotr(W[3],17)^rotr(W[3],19)^(W[3]>>10U));
|
|
|
-W[18]+=W[5];
|
|
|
-W[18]+=(rotr(W[23],6)^rotr(W[23],11)^rotr(W[23],25));
|
|
|
-W[18]+=ch(W[23],W[16],W[17]);
|
|
|
-W[18]+=K[53];
|
|
|
-W[22]+=W[18];
|
|
|
-W[18]+=(rotr(W[19],2)^rotr(W[19],13)^rotr(W[19],22));
|
|
|
+Vals[2]+=W[5];
|
|
|
+Vals[2]+=(rotr(Vals[7],6)^rotr(Vals[7],11)^rotr(Vals[7],25));
|
|
|
+Vals[2]+=ch(Vals[7],Vals[0],Vals[1]);
|
|
|
+Vals[2]+=K[53];
|
|
|
+Vals[6]+=Vals[2];
|
|
|
+Vals[2]+=(rotr(Vals[3],2)^rotr(Vals[3],13)^rotr(Vals[3],22));
|
|
|
|
|
|
W[6]+=(rotr(W[7],7)^rotr(W[7],18)^(W[7]>>3U));
|
|
|
W[6]+=W[15];
|
|
|
W[6]+=(rotr(W[4],17)^rotr(W[4],19)^(W[4]>>10U));
|
|
|
-W[17]+=W[6];
|
|
|
-W[17]+=(rotr(W[22],6)^rotr(W[22],11)^rotr(W[22],25));
|
|
|
-W[17]+=ch(W[22],W[23],W[16]);
|
|
|
-W[17]+=K[54];
|
|
|
-W[18]+=Ma(W[21],W[19],W[20]);
|
|
|
-W[21]+=W[17];
|
|
|
-W[17]+=(rotr(W[18],2)^rotr(W[18],13)^rotr(W[18],22));
|
|
|
-W[17]+=Ma(W[20],W[18],W[19]);
|
|
|
+Vals[1]+=W[6];
|
|
|
+Vals[1]+=(rotr(Vals[6],6)^rotr(Vals[6],11)^rotr(Vals[6],25));
|
|
|
+Vals[1]+=ch(Vals[6],Vals[7],Vals[0]);
|
|
|
+Vals[1]+=K[54];
|
|
|
+Vals[2]+=Ma(Vals[5],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=Vals[1];
|
|
|
+Vals[1]+=(rotr(Vals[2],2)^rotr(Vals[2],13)^rotr(Vals[2],22));
|
|
|
+Vals[1]+=Ma(Vals[4],Vals[2],Vals[3]);
|
|
|
|
|
|
W[7]+=(rotr(W[8],7)^rotr(W[8],18)^(W[8]>>3U));
|
|
|
W[7]+=W[0];
|
|
|
W[7]+=(rotr(W[5],17)^rotr(W[5],19)^(W[5]>>10U));
|
|
|
-W[16]+=W[7];
|
|
|
-W[16]+=(rotr(W[21],6)^rotr(W[21],11)^rotr(W[21],25));
|
|
|
-W[16]+=ch(W[21],W[22],W[23]);
|
|
|
-W[16]+=K[55];
|
|
|
-W[20]+=W[16];
|
|
|
-W[16]+=(rotr(W[17],2)^rotr(W[17],13)^rotr(W[17],22));
|
|
|
+Vals[0]+=W[7];
|
|
|
+Vals[0]+=(rotr(Vals[5],6)^rotr(Vals[5],11)^rotr(Vals[5],25));
|
|
|
+Vals[0]+=ch(Vals[5],Vals[6],Vals[7]);
|
|
|
+Vals[0]+=K[55];
|
|
|
+Vals[4]+=Vals[0];
|
|
|
+Vals[0]+=(rotr(Vals[1],2)^rotr(Vals[1],13)^rotr(Vals[1],22));
|
|
|
|
|
|
W[8]+=(rotr(W[9],7)^rotr(W[9],18)^(W[9]>>3U));
|
|
|
W[8]+=W[1];
|
|
|
W[8]+=(rotr(W[6],17)^rotr(W[6],19)^(W[6]>>10U));
|
|
|
-W[23]+=W[8];
|
|
|
-W[23]+=(rotr(W[20],6)^rotr(W[20],11)^rotr(W[20],25));
|
|
|
-W[23]+=ch(W[20],W[21],W[22]);
|
|
|
-W[23]+=K[56];
|
|
|
-W[16]+=Ma(W[19],W[17],W[18]);
|
|
|
-W[19]+=W[23];
|
|
|
-W[23]+=(rotr(W[16],2)^rotr(W[16],13)^rotr(W[16],22));
|
|
|
-W[23]+=Ma(W[18],W[16],W[17]);
|
|
|
+Vals[7]+=W[8];
|
|
|
+Vals[7]+=(rotr(Vals[4],6)^rotr(Vals[4],11)^rotr(Vals[4],25));
|
|
|
+Vals[7]+=ch(Vals[4],Vals[5],Vals[6]);
|
|
|
+Vals[7]+=K[56];
|
|
|
+Vals[0]+=Ma(Vals[3],Vals[1],Vals[2]);
|
|
|
+Vals[3]+=Vals[7];
|
|
|
+Vals[7]+=(rotr(Vals[0],2)^rotr(Vals[0],13)^rotr(Vals[0],22));
|
|
|
+Vals[7]+=Ma(Vals[2],Vals[0],Vals[1]);
|
|
|
|
|
|
W[9]+=(rotr(W[10],7)^rotr(W[10],18)^(W[10]>>3U));
|
|
|
W[9]+=W[2];
|
|
|
W[9]+=(rotr(W[7],17)^rotr(W[7],19)^(W[7]>>10U));
|
|
|
-W[22]+=W[9];
|
|
|
-W[22]+=(rotr(W[19],6)^rotr(W[19],11)^rotr(W[19],25));
|
|
|
-W[22]+=ch(W[19],W[20],W[21]);
|
|
|
-W[22]+=K[57];
|
|
|
+Vals[6]+=W[9];
|
|
|
+Vals[6]+=(rotr(Vals[3],6)^rotr(Vals[3],11)^rotr(Vals[3],25));
|
|
|
+Vals[6]+=ch(Vals[3],Vals[4],Vals[5]);
|
|
|
+Vals[6]+=K[57];
|
|
|
|
|
|
W[10]+=(rotr(W[11],7)^rotr(W[11],18)^(W[11]>>3U));
|
|
|
W[10]+=W[3];
|
|
|
W[10]+=(rotr(W[8],17)^rotr(W[8],19)^(W[8]>>10U));
|
|
|
-W[21]+=W[10];
|
|
|
-W[18]+=W[22];
|
|
|
-W[21]+=(rotr(W[18],6)^rotr(W[18],11)^rotr(W[18],25));
|
|
|
-W[21]+=ch(W[18],W[19],W[20]);
|
|
|
-W[21]+=K[58];
|
|
|
+Vals[5]+=W[10];
|
|
|
+Vals[2]+=Vals[6];
|
|
|
+Vals[5]+=(rotr(Vals[2],6)^rotr(Vals[2],11)^rotr(Vals[2],25));
|
|
|
+Vals[5]+=ch(Vals[2],Vals[3],Vals[4]);
|
|
|
+Vals[5]+=K[58];
|
|
|
|
|
|
W[11]+=(rotr(W[12],7)^rotr(W[12],18)^(W[12]>>3U));
|
|
|
W[11]+=W[4];
|
|
|
W[11]+=(rotr(W[9],17)^rotr(W[9],19)^(W[9]>>10U));
|
|
|
-W[20]+=W[11];
|
|
|
-W[17]+=W[21];
|
|
|
-W[20]+=(rotr(W[17],6)^rotr(W[17],11)^rotr(W[17],25));
|
|
|
-W[20]+=ch(W[17],W[18],W[19]);
|
|
|
-W[20]+=K[59];
|
|
|
+Vals[4]+=W[11];
|
|
|
+Vals[1]+=Vals[5];
|
|
|
+Vals[4]+=(rotr(Vals[1],6)^rotr(Vals[1],11)^rotr(Vals[1],25));
|
|
|
+Vals[4]+=ch(Vals[1],Vals[2],Vals[3]);
|
|
|
+Vals[4]+=K[59];
|
|
|
|
|
|
W[12]+=(rotr(W[13],7)^rotr(W[13],18)^(W[13]>>3U));
|
|
|
W[12]+=W[5];
|
|
|
W[12]+=(rotr(W[10],17)^rotr(W[10],19)^(W[10]>>10U));
|
|
|
-W[23]+=W[12];
|
|
|
-W[16]+=W[20];
|
|
|
-W[23]+=W[19];
|
|
|
-W[23]+=(rotr(W[16],6)^rotr(W[16],11)^rotr(W[16],25));
|
|
|
-W[23]+=ch(W[16],W[17],W[18]);
|
|
|
-//W[23]+=K[60]; diffed from 0xA41F32E7
|
|
|
+Vals[7]+=W[12];
|
|
|
+Vals[0]+=Vals[4];
|
|
|
+Vals[7]+=Vals[3];
|
|
|
+Vals[7]+=(rotr(Vals[0],6)^rotr(Vals[0],11)^rotr(Vals[0],25));
|
|
|
+Vals[7]+=ch(Vals[0],Vals[1],Vals[2]);
|
|
|
+//Vals[7]+=K[60]; diffed from 0xA41F32E7
|
|
|
|
|
|
#define FOUND (0x80)
|
|
|
#define NFLAG (0x7F)
|
|
|
|
|
|
#if defined(VECTORS4)
|
|
|
- W[23] ^= 0x136032ED;
|
|
|
- bool result = W[23].x & W[23].y & W[23].z & W[23].w;
|
|
|
+ Vals[7] ^= 0x136032ED;
|
|
|
+ bool result = Vals[7].x & Vals[7].y & Vals[7].z & Vals[7].w;
|
|
|
if (!result) {
|
|
|
- if (!W[23].x)
|
|
|
+ if (!Vals[7].x)
|
|
|
output[FOUND] = output[NFLAG & nonce.x] = nonce.x;
|
|
|
- if (!W[23].y)
|
|
|
+ if (!Vals[7].y)
|
|
|
output[FOUND] = output[NFLAG & nonce.y] = nonce.y;
|
|
|
- if (!W[23].z)
|
|
|
+ if (!Vals[7].z)
|
|
|
output[FOUND] = output[NFLAG & nonce.z] = nonce.z;
|
|
|
- if (!W[23].w)
|
|
|
+ if (!Vals[7].w)
|
|
|
output[FOUND] = output[NFLAG & nonce.w] = nonce.w;
|
|
|
}
|
|
|
#elif defined(VECTORS2)
|
|
|
- W[23] ^= 0x136032ED;
|
|
|
- bool result = W[23].x & W[23].y;
|
|
|
+ Vals[7] ^= 0x136032ED;
|
|
|
+ bool result = Vals[7].x & Vals[7].y;
|
|
|
if (!result) {
|
|
|
- if (!W[23].x)
|
|
|
+ if (!Vals[7].x)
|
|
|
output[FOUND] = output[NFLAG & nonce.x] = nonce.x;
|
|
|
- if (!W[23].y)
|
|
|
+ if (!Vals[7].y)
|
|
|
output[FOUND] = output[NFLAG & nonce.y] = nonce.y;
|
|
|
}
|
|
|
#else
|
|
|
- if (W[23] == 0x136032ED)
|
|
|
+ if (Vals[7] == 0x136032ED)
|
|
|
output[FOUND] = output[NFLAG & nonce] = nonce;
|
|
|
#endif
|
|
|
}
|
Con Kolivas