# how to implementing gaussian elimination for binary equations

i have this system of equations
1=x⊕y⊕z
1=x⊕y⊕w
0=x⊕w⊕z
1=w⊕y⊕z

I'm trying to implement gaussian elimination to solve this system as described here , replacing division,subtraction and multiplication by XOR, but it gives my wrong answer..the correct answer is (x,y,z,w)=(0,1,0,0)
what am i doing wrong ?

``````public static void ComputeCoefficents(byte[,] X, byte[] Y)
{
int I, J, K, K1, N;
N = Y.Length;
for (K = 0; K < N; K++)
{
K1 = K + 1;
for (I = K; I < N; I++)
{
if (X[I, K] != 0)
{
for (J = K1; J < N; J++)
{
X[I, J] /= X[I, K];
}
//Y[I] /= X[I, K];
Y[I] ^= X[I, K];

}
}
for (I = K1; I < N; I++)
{
if (X[I, K] != 0)
{
for (J = K1; J < N; J++)
{
X[I, J] ^= X[K, J];
}
Y[I] ^= Y[K];
}
}
}
for (I = N - 2; I >= 0; I--)
{
for (J = N - 1; J >= I + 1; J--)
{
//Y[I] -= AndOperation(X[I, J], Y[J]);
Y[I] ^= (byte)(X[I, J]* Y[J]);

}
}
}
``````
-
Something seems fishy. Multiplication by 1 should leave a value unchanged - if you're replacing it with `xor`, multiplication by 1 will invert everything. Normally, if logic operators are substituted for arithmetic, addition is replaced by either `or` or `xor`. `or` doesn't have an easy inverse, but `xor` is its own inverse. Multiplication is replaced by `and`. There's no easy inverse of `and`, but you shouldn't need division in this case. You shouldn't even need multiplication. –  Steve314 Jul 14 '12 at 13:13
This algorithm only works under certain conditions. It is not stable by any means. You can leave the first for-loop away, because divisions would only be performed by 1, which results in no change. Then, in my oppoinion, the remaining `for (J = K1; J < N; J++)` must be `for (J = 0; J < N; J++)`. But again, this algorithm is not stable and you should really use a library for that task. Or if your problem is less general, maybe, we can compose an algorithm. –  Nico Schertler Jul 14 '12 at 16:53
add comment

## 1 Answer

I think you're trying to apply Gaussian elimination mod 2 for this.

In general you can do Gaussian elimination mod k, if your equations are of the form

``````a_1 * x + b_1 * y + c_1 * z = d_1
a_2 * x + b_2 * y + c_2 * z = d_2
a_3 * x + b_3 * y + c_3 * z = d_3
a_4 * x + b_4 * y + c_4 * z = d_4
``````

And in Z2 * is `and` and + is `xor`, so you can use Gausian elimination to solve equations of the form

``````x (xor) y (xor) z   = 1
x (xor) y (xor) w   = 1
x (xor) z (xor) w   = 0
y (xor) z (xor) w   = 1
``````

Lets do this equation using Gausian elimination by hand.

The corresponding augmented matrix is:

`````` 1 1 1 0 | 1
1 1 0 1 | 1
1 0 1 1 | 0
0 1 1 1 | 1

1 1 1 0 | 1
0 0 1 1 | 0   (R2 = R2 + R1)
0 1 0 1 | 1   (R3 = R3 + R1)
0 1 1 1 | 1

1 1 1 0 | 1
0 1 1 1 | 1   (R2 = R4)
0 1 0 1 | 1
0 0 1 1 | 0   (R4 = R2)

1 0 0 1 | 0   (R1 = R1 + R2)
0 1 1 1 | 1
0 0 1 0 | 0   (R3 = R3 + R2)
0 0 1 1 | 0

1 0 0 1 | 0
0 1 0 1 | 1   (R2 = R2 + R3)
0 0 1 0 | 0
0 0 0 1 | 0   (R4 = R4 + R3)

1 0 0 0 | 0   (R1 = R1 + R4)
0 1 0 0 | 1   (R2 = R2 + R4)
0 0 1 0 | 0
0 0 0 1 | 0
``````

Giving your solution of (x,y,z,w) = (0,1,0,0).

But this requires row pivoting - which I can't see in your code.

There's also some multiplications and divisions floating around in your code that probably dont need to be there. I'd expect the code to look like this: (You'll need to fix the TODOs).

``````public static void ComputeCoefficents(byte[,] X, byte[] Y) {
int I, J, K, K1, N;
N = Y.Length;

for (K = 0; K < N; K++) {
//First ensure that we have a non-zero entry in X[K,K]
if( X[K,K] == 0 ) {
for(int i = 0; i<N ; ++i ) {
if(X[i,K] != 0 ) {
for( ... ) //TODO: A loop to swap the entries
//TODO swap entries in Y too
}
}
if( X[K,K] == 0 ) {
// TODO: Handle the case where we have a zero column
//      - for now we just move on to the next column
//      - This means we have no solutions or multiple
//        solutions
continue
}

// Do full row elimination.
for( int I = 0; I<N; ++I)
{
if( I!=K ){ //Don't self eliminate
if( X[I,K] ) {
for( int J=K; J<N; ++J ) { X[I,J] = X[I,J] ^ X[K,J]; }
Y[J] = Y[J] ^ Y[K];
}
}
}
}

//Now assuming we didnt hit any zero columns Y should be our solution.
``````

}

-
add comment