?pptri

Syntax

FORTRAN 77:

call spptri( uplo, n, ap, info )

call dpptri( uplo, n, ap, info )

call cpptri( uplo, n, ap, info )

call zpptri( uplo, n, ap, info )

Fortran 95:

call pptri( ap [,uplo] [,info] )

C:

lapack_int LAPACKE_<?>pptri( int matrix_order, char uplo, lapack_int n, <datatype>* ap );

Include Files

The FORTRAN 77 interfaces are specified in the mkl_lapack.fi and mkl_lapack.h include files, the Fortran 95 interfaces are specified in the lapack.f90 include file, and the C interfaces are specified in the mkl_lapacke.h include file.

Description

The routine computes the inverse inv(A) of a symmetric positive definite or, for complex flavors, Hermitian positive-definite matrix A in packed form. Before calling this routine, call ?pptrf to factorize A.

Input Parameters

The data types are given for the Fortran interface. A <datatype> placeholder, if present, is used for the C interface data types in the C interface section above. See C Interface Conventions for the C interface principal conventions and type definitions.

Output Parameters

Fortran 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 Fortran 95 Interface Conventions.

Specific details for the routine pptri interface are as follows:

Application Notes

The computed inverse X satisfies the following error bounds:

||XA - I||2 ≤ c(n)εκ2(A), ||AX - I||2 ≤ c(n)εκ2(A),

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

The 2-norm ||A||₂ of a matrix A is defined by ||A||₂ =max_x·x=1(Ax·Ax)^1/2, and the condition number κ₂(A) is defined by κ₂(A) = ||A||₂ ||A^-1||₂ .

The total number of floating-point operations is approximately (2/3)n³ for real flavors and (8/3)n³ for complex flavors.