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I have to multiply a sparse matrix in compressed column storage with a column vector(I have to parallelize it in open cl).I searched all around the internet.Spent so many days but couldnt find anything.(I am allowed to search the internet as i have to convert it to parallel).But i was only able to find code for compressed row storage.

spmv_csr_serial(const int num_rows ,
                const int * ptr ,
                const int * indices ,
                const float * data ,
                const float * x,
                float * y)
{
    for(int row = 0; i < num_rows; i++){
        float dot = 0;
        int row_start = ptr[row];
        int row_end = ptr[row+1];

        for (int jj = row_start; jj < row_end; jj++)
            dot += data[jj] * x[indices[jj]];

        y[row] += dot;
    }
}

The compressed column storage doesn't have a row ptr. So how do I multiply it with the vector? I just need the serial code and I would convert it to parallel myself.

Here is my OpenCL kernel for this project

enter code here
__kernel void mykernel(__global const int* val,__global const int* index,__global const int * ptr,__global const int* x,__global int* y) 
{ 
    int id=get_global_id(0); 
    int colstart=ptr[id]; 
    int colend=ptr[id+1]; 
    for(int j=colstart;j<colend;j++) 
    { 
        y[index[j]]=val[j]*x[index[j]]; 
    } 
}

this code returns garbage value in open cl kernel. This was my serial code.

   spmv_csr_serial(const int num_rows ,
                const int * ptr ,
                const int * indices ,
                const float * data ,
                const float * x,
                float * y)
{
    for(int row = 0; i < num_rows; i++){
        float dot = 0;
        int colstart = ptr[row];
        int colend = ptr[row+1];

      for(int j=colstart;j<colend;j++) 
    { 
        y[index[j]]=val[j]*x[index[j]]; 
    }

    }
}

Algorithm for dense matrix vector multiplication

For(int i=0;i<A.RowLength;i++) 
{
    For(int j=0;j<vector.length;j++) 
    { 
        Result[i]=Result[i]+A[i][j]*vector[j];
    }
} 
share|improve this question

closed as not a real question by Bart, j0k, jonsca, unkulunkulu, ЯegDwight Sep 5 '12 at 10:10

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

Generally, the algorithm for doing a matrix vector computation is as follows

y = 0
for i = 0 : Nr - 1
    for j = 0 : Nc - 1
        y[i] += M[i,j] * x[j]

Compressed-row storage:

Instead of doing an ordinary loop over all columns, we loop over the non-zeros entries only:

y = 0
for i = 0 : Nr - 1
    for j = 0 : numElementsInRow(i) - 1
        y[i] += M[i, columnIndex(i,j)] * x[columnIndex(i,j)]

where numElementsInRow(i) returns the number of non-zeros in the i-th row and columnIndex(i,j) gives the j-th column index in the i-th row.

In your implementation above, your columnIndex(i,j) mapping is done by the two arrays ptr and indices, i.e. columnIndex(i,j) == indices[ptr[i] + j] and the number of elements is given by numElementsInRow(i) == ptr[i+1] - ptr[i]. There is no need for indexing the matrix, because you only store the compressed version of it.

Compressed-column storage:

Now change the order of the two loops and loop over the non-zeros in the rows:

y = 0
for j = 0 : Nc - 1
    for i = 0 : numElementsInColumn(j) - 1
        y[rowIndex(j,i)] += M[rowIndex(j,i), j] * x[j]

And the rest is analog to the CRS format.

share|improve this answer
  1. Write out an algorithm for dense matrix-vector multiplication. If you don't know how to do this, look in any elementary linear algebra textbook, or ask your professor.
  2. Your algorithm will iterate over both the rows and columns of the matrix; re-arrange the algorithm if necessary so that the inner loop is over the columns.
  3. Modify the algorithm to use your dense storage scheme for accessing the matrix.
share|improve this answer
    
The algo you asked me to write will be For(int i=0;i<A.RowLength;i++) { For(int j=0;j<vector.length;j++) { Result[i]=Result[i]+A[i][j]*vector[j];}} – user1646468 Sep 4 '12 at 15:03
    
In compressed row storage we had row ptr like i wrote in the very first code but how do iterate with a column ptr? seems impossible.too confusing – user1646468 Sep 4 '12 at 15:13

CCS is similar to CRS, just transposed. You don't have a row pointer, but you have a similar column pointer. Thus, your sequential loop should be

for(int col=0; col<num_cols; col++){
  for(int j=ptr[col];j<ptr[col+1]; j++) { 
    y[indices[j]] += val[j]*x[col]; 
  }
}

Remember to zero the y vector before.

Which one do you think is faster? CCS or CRS?

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