Developer Reference for Intel® oneAPI Math Kernel Library for Fortran

ID 766686
Date 11/07/2023
Public

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?trtri

Computes the inverse of a triangular matrix.

Syntax

call strtri( uplo, diag, n, a, lda, info )

call dtrtri( uplo, diag, n, a, lda, info )

call ctrtri( uplo, diag, n, a, lda, info )

call ztrtri( uplo, diag, n, a, lda, info )

call trtri( a [,uplo] [,diag] [,info] )

Include Files

  • mkl.fi, lapack.f90

Description

The routine computes the inverse inv(A) of a triangular matrix A.

Input Parameters

uplo

CHARACTER*1. Must be 'U' or 'L'.

Indicates whether A is upper or lower triangular:

If uplo = 'U', then A is upper triangular.

If uplo = 'L', then A is lower triangular.

diag

CHARACTER*1. Must be 'N' or 'U'.

If diag = 'N', then A is not a unit triangular matrix.

If diag = 'U', A is unit triangular: diagonal elements of A are assumed to be 1 and not referenced in the array a.

n

INTEGER. The order of the matrix A; n 0.

a

REAL for strtri

DOUBLE PRECISION for dtrtri

COMPLEX for ctrtri

DOUBLE COMPLEX for ztrtri.

Array: size lda by *size max(1,lda*n). Contains the matrix A. The second dimension of a must be at least max(1,n).

lda

INTEGER. The first dimension of a; lda max(1, n).

Output Parameters

a

Overwritten by the matrix inv(A).

info

INTEGER.

If info = 0, the execution is successful.

If info = -i, the i-th parameter had an illegal value.

If info = i, the i-th diagonal element of A is zero, A is singular, and the inversion could not be completed.

LAPACK 95 Interface Notes

Routines in Fortran 95 interface have fewer arguments in the calling sequence than their FORTRAN 77 counterparts. For general conventions applied to skip redundant or reconstructible arguments, see LAPACK 95 Interface Conventions.

Specific details for the routine trtri interface are as follows:

a

Holds the matrix A of size (n,n).

uplo

Must be 'U' or 'L'. The default value is 'U'.

diag

Must be 'N' or 'U'. The default value is 'N'.

Application Notes

The computed inverse X satisfies the following error bounds:

|XA - I|  c(n)ε |X||A|

|XA - I|  c(n)ε |A-1||A||X|,

where c(n) is a modest linear function of n; ε is the machine precision; I denotes the identity matrix.

The total number of floating-point operations is approximately (1/3)n3 for real flavors and (4/3)n3 for complex flavors.