source: CIVL/examples/compare/GaussianElimination/gaussj_driver.c

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Last change on this file was ea777aa, checked in by Alex Wilton <awilton@…>, 3 years ago

Moved examples, include, build_default.properties, common.xml, and README out from dev.civl.com into the root of the repo.

git-svn-id: svn://vsl.cis.udel.edu/civl/trunk@5704 fb995dde-84ed-4084-dfe6-e5aef3e2452c
  • Property mode set to 100644
File size: 4.2 KB
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1/* http://web.mit.edu/10.001/Web/Course_Notes/NRC_Notes/Gauss_Jordan_NRC.HTML */
2/* Program Driver file for gaussj.c routine */
3/* Driver for routine for gaussj.c */
4/* Program gauss_driver.c */
5#include <stdio.h>
6#include <stdlib.h>
7#include "nr.h"
8#include "nrutil.h" /* Utilities program, listed in Appendix B of NRC book */
9 /* NRC stands for Numerical Recipes in C */
10
11#define MAXSTR 80
12
13int main(void)
14{
15 int j,k,l,m,n,NP,MP;
16 float **a,**ai,**u,**b,**x,**t;
17 char dummy[MAXSTR];
18 FILE *fp;
19/*
20* a is the coefficient matrix.
21* ai=a before gaussj is called, ai = inverse(a) after the function call.
22* u = ai*a, we define this to test the program,
23* if correct u should be the unit matrix.
24* b = matrix of dimension n*m where m is the number of r.h.s. vectors for which
25* you want to solve A.x = b.
26* x = b before gaussj is called, x is the solution vector after gaussj is called.
27* t is an n*m matrix defined to test the solution.
28*/
29/*
30* Read NP to allocate space for the matrices.
31*/
32 printf("Input the dimension of the largest square matrix to be used\n");
33 scanf("%d",&NP);
34 printf("Input the maximum number of r.h.s. vectors\n");
35 scanf("%d",&MP);
36
37 a=matrix(1,NP,1,NP); /* These commands have the same function as calloc */
38 ai=matrix(1,NP,1,NP);/* They are provided by the utility programs in NRC */
39 u=matrix(1,NP,1,NP);
40 b=matrix(1,NP,1,MP);
41 x=matrix(1,NP,1,MP);
42 t=matrix(1,NP,1,MP);
43
44 if ((fp = fopen("gaussj.dat","r")) == NULL)
45 nrerror("Data file gaussj.dat not found\n");
46 /* See a typical data file appended */
47 while (!feof(fp)) {
48 fgets(dummy,MAXSTR,fp);
49 fgets(dummy,MAXSTR,fp);
50 fscanf(fp,"%d %d ",&n,&m);
51 fgets(dummy,MAXSTR,fp);
52 for (k=1;k<=n;k++)
53 for (l=1;l<=n;l++) fscanf(fp,"%f ",&a[k][l]);
54 fgets(dummy,MAXSTR,fp);
55 for (l=1;l<=m;l++)
56 for (k=1;k<=n;k++) fscanf(fp,"%f ",&b[k][l]);
57 /* save matrices for later testing of results */
58 for (l=1;l<=n;l++) {
59 for (k=1;k<=n;k++) ai[k][l]=a[k][l];
60 for (k=1;k<=m;k++) x[l][k]=b[l][k];
61 }
62
63 /* Call gaussj: note that after the call, a is replaced by its
64 inverse and b is replaced by the solution vector */
65/*--------------------------------------------------------------------- */
66 gaussj(ai,n,x,m);
67/*--------------------------------------------------------------------- */
68 printf("\nInverse of matrix a : \n");
69 for (k=1;k<=n;k++) {
70 for (l=1;l<=n;l++) printf("%12.6f",ai[k][l]);
71 printf("\n");
72 }
73 /* check inverse */
74 printf("\na times a-inverse:\n");
75 for (k=1;k<=n;k++) {
76 for (l=1;l<=n;l++) {
77 u[k][l]=0.0;
78 for (j=1;j<=n;j++)
79 u[k][l] += (a[k][j]*ai[j][l]);
80 }
81 for (l=1;l<=n;l++) printf("%12.6f",u[k][l]);
82 printf("\n");
83 }
84 /* check vector solutions */
85 printf("\nCheck the following for equality:\n");
86 printf("%21s %14s\n","original","matrix*sol'n");
87 for (l=1;l<=m;l++) {
88 printf("vector %2d: \n",l);
89 for (k=1;k<=n;k++) {
90 t[k][l]=0.0;
91 for (j=1;j<=n;j++)
92 t[k][l] += (a[k][j]*x[j][l]);
93 printf("%8s %12.6f %12.6f\n"," ",
94 b[k][l],t[k][l]);
95 }
96 }
97 }
98 fclose(fp);
99 free_matrix(t,1,NP,1,MP);
100 free_matrix(x,1,NP,1,MP);
101 free_matrix(b,1,NP,1,MP);
102 free_matrix(u,1,NP,1,NP);
103 free_matrix(ai,1,NP,1,NP);
104 free_matrix(a,1,NP,1,NP);
105 return 0;
106}
107
108
109
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