Estimates the condition number of a real triangular matrix.

Routine LFCRT estimates the condition number of a real triangular matrix. The L1 condition number of the matrix A is defined to be κ(A) = ∥A∥1∥A-1∥1. Since it is expensive to compute ∥A-1∥1, the condition number is only estimated. The estimation algorithm is the same as used by LINPACK and is described by Cline et al. (1979).

If the estimated condition number is greater than 1/Ɛ (where Ɛ is machine precision), a warning error is issued. This indicates that very small changes in A can cause very large changes in the solution x.

The underlying code is based on either LINPACK , LAPACK, or ScaLAPACK code depending upon which supporting libraries are used during linking. For a detailed explanation see Using ScaLAPACK, LAPACK, LINPACK, and EISPACK in the Introduction section of this manual.

The arguments which differ from the standard version of this routine are:

All other arguments are global and are the same as described for the standard version of the routine. In the argument descriptions above, MXLDA and MXCOL can be obtained through a call to SCALAPACK_GETDIM (see Utilities) after a call to SCALAPACK_SETUP (see Utilities) has been made. See the ScaLAPACK Example below.

An estimate of the reciprocal condition number is computed for a 3 × 3 lower triangular coefficient matrix.

The same lower triangular matrix as in the example above is used in this distributed computing example. An estimate of the reciprocal condition number is computed for the 3 × 3 lower triangular coefficient matrix. SCALAPACK_MAP is an IMSL utility routine (see Chapter 11, “Utilities”) used to map an array to the processor grid. It is used here for brevity. DESCINIT is a ScaLAPACK tools routine which initializes the descriptors for the local arrays.