Developer Reference

Intel® oneAPI Math Kernel Library LAPACK Examples

ID 766877
Date 3/31/2023
Public

A newer version of this document is available. Customers should click here to go to the newest version.

Document Table of Contents

LAPACKE_cgeev Example Program in C for Column Major Data Layout

/*******************************************************************************
*  Copyright (C) 2009-2015 Intel Corporation. All Rights Reserved.
*  The information and material ("Material") provided below is owned by Intel
*  Corporation or its suppliers or licensors, and title to such Material remains
*  with Intel Corporation or its suppliers or licensors. The Material contains
*  proprietary information of Intel or its suppliers and licensors. The Material
*  is protected by worldwide copyright laws and treaty provisions. No part of
*  the Material may be copied, reproduced, published, uploaded, posted,
*  transmitted, or distributed in any way without Intel's prior express written
*  permission. No license under any patent, copyright or other intellectual
*  property rights in the Material is granted to or conferred upon you, either
*  expressly, by implication, inducement, estoppel or otherwise. Any license
*  under such intellectual property rights must be express and approved by Intel
*  in writing.
*
********************************************************************************
*/
/*
   LAPACKE_cgeev Example.
   ======================

   Program computes the eigenvalues and left and right eigenvectors of a general
   rectangular matrix A:

   ( -3.84,  2.25) ( -8.94, -4.75) (  8.95, -6.53) ( -9.87,  4.82)
   ( -0.66,  0.83) ( -4.40, -3.82) ( -3.50, -4.26) ( -3.15,  7.36)
   ( -3.99, -4.73) ( -5.88, -6.60) ( -3.36, -0.40) ( -0.75,  5.23)
   (  7.74,  4.18) (  3.66, -7.53) (  2.58,  3.60) (  4.59,  5.41)

   Description.
   ============

   The routine computes for an n-by-n complex nonsymmetric matrix A, the
   eigenvalues and, optionally, the left and/or right eigenvectors. The right
   eigenvector v(j) of A satisfies

   A*v(j)= lambda(j)*v(j)

   where lambda(j) is its eigenvalue. The left eigenvector u(j) of A satisfies

   u(j)H*A = lambda(j)*u(j)H

   where u(j)H denotes the conjugate transpose of u(j). The computed
   eigenvectors are normalized to have Euclidean norm equal to 1 and
   largest component real.

   Example Program Results.
   ========================

 LAPACKE_cgeev (column-major, high-level) Example Program Results

 Eigenvalues
 ( -9.43,-12.98) ( -3.44, 12.69) (  0.11, -3.40) (  5.76,  7.13)

 Left eigenvectors
 (  0.24, -0.18) (  0.61,  0.00) ( -0.18, -0.33) (  0.28,  0.09)
 (  0.79,  0.00) ( -0.05, -0.27) (  0.82,  0.00) ( -0.55,  0.16)
 (  0.22, -0.27) ( -0.21,  0.53) ( -0.37,  0.15) (  0.45,  0.09)
 ( -0.02,  0.41) (  0.40, -0.24) (  0.06,  0.12) (  0.62,  0.00)

 Right eigenvectors
 (  0.43,  0.33) (  0.83,  0.00) (  0.60,  0.00) ( -0.31,  0.03)
 (  0.51, -0.03) (  0.08, -0.25) ( -0.40, -0.20) (  0.04,  0.34)
 (  0.62,  0.00) ( -0.25,  0.28) ( -0.09, -0.48) (  0.36,  0.06)
 ( -0.23,  0.11) ( -0.10, -0.32) ( -0.43,  0.13) (  0.81,  0.00)
*/
#include <stdlib.h>
#include <stdio.h>
#include "mkl_lapacke.h"

/* Auxiliary routines prototypes */
extern void print_matrix( char* desc, MKL_INT m, MKL_INT n, MKL_Complex8* a, MKL_INT lda );

/* Parameters */
#define N 4
#define LDA N
#define LDVL N
#define LDVR N

/* Main program */
int main() {
        /* Locals */
        MKL_INT n = N, lda = LDA, ldvl = LDVL, ldvr = LDVR, info;
        /* Local arrays */
        MKL_Complex8 w[N], vl[LDVL*N], vr[LDVR*N];
        MKL_Complex8 a[LDA*N] = {
           {-3.84f,  2.25f}, {-0.66f,  0.83f}, {-3.99f, -4.73f}, { 7.74f,  4.18f},
           {-8.94f, -4.75f}, {-4.40f, -3.82f}, {-5.88f, -6.60f}, { 3.66f, -7.53f},
           { 8.95f, -6.53f}, {-3.50f, -4.26f}, {-3.36f, -0.40f}, { 2.58f,  3.60f},
           {-9.87f,  4.82f}, {-3.15f,  7.36f}, {-0.75f,  5.23f}, { 4.59f,  5.41f}
        };
        /* Executable statements */
        printf( "LAPACKE_cgeev (column-major, high-level) Example Program Results\n" );
        /* Solve eigenproblem */
        info = LAPACKE_cgeev( LAPACK_COL_MAJOR, 'V', 'V', n, a, lda, w, vl,
         ldvl, vr, ldvr );
        /* Check for convergence */
        if( info > 0 ) {
                printf( "The algorithm failed to compute eigenvalues.\n" );
                exit( 1 );
        }
        /* Print eigenvalues */
        print_matrix( "Eigenvalues", 1, n, w, 1 );
        /* Print left eigenvectors */
        print_matrix( "Left eigenvectors", n, n, vl, ldvl );
        /* Print right eigenvectors */
        print_matrix( "Right eigenvectors", n, n, vr, ldvr );
        exit( 0 );
} /* End of LAPACKE_cgeev Example */

/* Auxiliary routine: printing a matrix */
void print_matrix( char* desc, MKL_INT m, MKL_INT n, MKL_Complex8* a, MKL_INT lda ) {
        MKL_INT i, j;
        printf( "\n %s\n", desc );
        for( i = 0; i < m; i++ ) {
                for( j = 0; j < n; j++ )
                        printf( " (%6.2f,%6.2f)", a[i+j*lda].real, a[i+j*lda].imag );
                printf( "\n" );
        }
}