# Parallel Smith Waterman Algorithm implementation in CUDA - Last 2 rows not being computed

I'm working on a parallel Smith Waterman algorithm implementation in CUDA, but have now run into some trouble. The last two rows of the score matrix are not being computed at all, they just show zero. Rest of the matrix is computed correctly.

The algo runs in two phases. First the number of threads increase to the size of the seq length, then shrink back to 0. The kernels are called repeatedly with different number of threads and values of k. c is my score matrix, a,b the sequences and k is the kth anti diagonal (i+j=k). The values are offset by 1 as in Smith Waterman algo.

Here are my kernels:

``````__global__ void SmithWKernelExpand(int (*c)[arraySize+1], const char *a, const char *b, int *k)
{
int j = ((*k)-i)+1;
int north=c[i][(j)-1]-1;            //Indel
int west=c[i-1][j]-1;
int northwest;
if (((int) a[i-1])==((int)b[(j)-1]))
northwest=c[i-1][(j)-1]+2;      //Match
else
northwest=c[i-1][(j)-1]-1;      //Mismatch
//c[i][j] = max(max(north, west),max(northwest,0));
c[i][j]=(*k);  //Print the number of anti diagonal - For Debugging
}

__global__ void SmithWKernelShrink(int (*c)[arraySize+1], const char *a, const char *b, int *k)
{
int j = ((*k)-i)+1;
int north=c[i][(j)-1]-1;            //Indel
int west=c[i-1][j]-1;
int northwest;
if (((int) a[i-1])==((int)b[(j)-1]))
northwest=c[i-1][(j)-1]+2;      //Match
else
northwest=c[i-1][(j)-1]-1;      //Mismatch
//c[i][j] = max(max(north, west),max(northwest,0));
c[i][j]=(*k);  //Print the number of anti diagonal - For Debugging
}
``````

The output is:

``````0       0       0       0       0       0       0       0       0
0       1       2       3       4       5       6       7       8
0       2       3       4       5       6       7       8       9
0       3       4       5       6       7       8       9       10
0       4       5       6       7       8       9       10      11
0       5       6       7       8       9       10      11      12
0       6       7       8       9       10      11      12      13
0       0       0       0       0       0       0       0       0
0       0       0       0       0       0       0       0       0
``````