# Solving a banded system from C using LAPACK's DGBSV

I have tried to search for a similar thread related to this topic, but nobody seems to care for banded systems (...)

I am interested in solving a banded matrix using LAPACK/ScaLAPACK from a C code. First, I want to achieve a sequential solution with LAPACK, before attempting anything with ScaLAPACK.

Problem: The row-major/column-major difference between both languages seems to be affecting my solution process. Here's the system I intend to solve:

The following code, translates that matrix into LAPACK's banded data structure, specified in here.

``````  int rr = 6;     // Rank.
int kl = 2;     // Number of lower diagonals.
int ku = 1;     // Number of upper diagonals.
int nrhs = 1;   // Number of RHS.
double vals[36] = {0.0,   0.0,   0.0,   0.0,   0.0,   0.0,  // Req. ex. space.
0.0,   0.0,   0.0,   0.0,   0.0,   0.0,  // Req. ex. space.
666.0,   0.0,   0.0,   0.0,   0.0,  22.5,  // First up diag.
1.0, -50.0, -50.0, -50.0, -50.0,  -2.6,  // Main diagonal.
27.5,  27.5,  27.5,  27.5,   4.0, 666.0,  // First low diag.
0.0,   0.0,   0.0,  -1.0, 666.0, 666.0}; // 2nd low diag.

int lda = rr;   // Leading dimension of the matrix.
int ipiv[6];    // Information on pivoting array.
double rhs[] = {1.0, 1.0, 1.0, 1.0, 1.0, 0.0};  // RHS.
int ldb = lda;  // Leading dimension of the RHS.
int info = 0;   // Evaluation variable for solution process.
int ii;         // Iterator.
int jj;         // Iterator.

dgbsv_(&rr, &kl, &ku, &nrhs, vals, &lda, ipiv, rhs, &ldb, &info);

printf("info = %d\n", info);
for (ii = 0; ii < ldb; ii++) {
printf("%f\n", rhs[ii]);
}
putchar('\n');
``````

As I said, I am worried that the way I am translating my matrix, is incorrect given the col-major nature, as well as the indexing nature of Fortran, since my solution yields:

``````[ejspeiro@node01 lapack-ex02]\$ make runs
`pwd`/blogs < blogs.in
info = 1
1.000000
1.000000
1.000000
1.000000
1.000000
0.000000
``````

The return value from Fortran `info = 1` implies that factorization was completed, but `U(1,1) = 0` in the LU factorization of `A = LU`.

Any help is more than welcome.

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Is there any way that I can call this as solved? I actually got a functioning code! :D –  Eduardo Sanchez Mar 20 '13 at 22:27

All right, I will answer this in order to sort of call it "solved".

These files, represent the functioning code. I am making this available in case anybody has the same problem: solving a banded system of equations, using LAPACK from C.

And if anybody has any extra suggestions as far as the implementation goes, I will gladly welcome them!

My next step is to distribute the core matrices, in order to solve with ScaLAPACK.

Thanks!

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``````  double vals[36] = {0.0,   0.0,   0.0,   1.0,  27.5,   0.0,