# Matrix inverse between Matlab/Octave and C++

EDIT : sorry bad example, i tried to obtain the same numbers as in my program with no luck i can't get an example to work. the only thing i can do is to show you the differences between Octave/Matlab and C++

for example in Octave/Matlab i have: 3.8070e+010 and in C++: 38121149284.106712

or -1.4971e+011 in ML/O and -149962686456.46307 in C++

so you see there is a difference.

Please give me some advice to where look for a different approach.

function A :

``````void InvdiagMat(double **Mat, int NbElement)
{
double ** temp;
int i;
temp=new double*[NbElement];
for(i=0;i<NbElement;i++)
{
temp[i]=new double [NbElement];
for(int j=0;j<NbElement;j++)
{
temp[i][j]=0;
}
}

for(i=0;i<NbElement;i++)
{

for(int j=0;j<NbElement;j++)
{
temp[i][i]=1/Mat[i][i];
if(j!=i)
{
temp[i][j]=-Mat[i][j]/Mat[i][i];
}
for(int k=0;k<NbElement;k++)
{

if(k!=i)
{
temp[k][i]=Mat[k][i]/Mat[i][i];
}
if(j!=i &&k!=i)
{
temp[k][j]=Mat[k][j]-Mat[i][j]*Mat[k][i]/Mat[i][i];
}
}

}
for(int i=0;i<NbElement;i++)
{
for(int j=0;j<NbElement;j++)
{
Mat[i][j]=temp[i][j];
}

}
}
``````

}

and function B :

``````    double** invdet(double** a, int n)
/* This function computes both the determinant of matrix a and its inverse matrix */

{
int i,j,k,l,m,*indx;
double d,*col;

double ** inv;
inv = new double*[n];
for (j=0; j<n; j++)
{
inv[j] = new double[n];
}

col=vector(0, n-1);
indx=ivector(0, n-1);

ludcmp(a, n, indx, &d);
for (j=0; j<n; j++)
{
d *= a[j][j];
for (i=0; i<n; i++)
col[i]=0.0;
col[j]=1.0;
lubksb(a,n,indx,col);
for (i=0; i<n; i++)
inv[i][j]=col[i];
}

return inv;
}

void ludcmp(double** aa, int n, int *indx, double*d)
{
int i,imax=0,j,k;
double big,dum,sum,temp;
double *vv;

vv=vector(0,n-1);
*d=1.0;
for (i=0; i<n;i++) {
big=0.0;
for (j=0; j<n; j++)
if ((temp=fabs(aa[i][j])) > big) big=temp;
//if (big == 0.0) printf("Singular matrix\n");
vv[i]=1.0/big;
}
for (j=0; j<n; j++)
{
for (i=0; i<j; i++) {
sum=aa[i][j];
for (k=0; k<i; k++)
sum -= aa[i][k]*aa[k][j];
aa[i][j]=sum;
}
big=0.0;
for (i=j; i<n; i++)
{
sum=aa[i][j];
for (k=0; k<j; k++)
sum -= aa[i][k]*aa[k][j];
aa[i][j]=sum;
if ((dum = vv[i] * fabs(sum)) >= big)
{
big = dum;
imax = i;
}
}
if (j != imax)
{
for (k=0; k<n; k++)
{
dum = aa[imax][k];
aa[imax][k] = aa[j][k];
aa[j][k] = dum;
}
*d = -(*d);
vv[imax] = vv[j];
}
indx[j]=imax;
if (aa[j][j] == 0.0)
aa[j][j]=TINY;
if (j != n-1)
{
dum=1.0/aa[j][j];
for (i = j+1; i < n; i++)
aa[i][j] *= dum;
}
}
}

void lubksb(double **a,int n,int *indx,double b[])
{
int i,ii=0,ip,j;
double sum;

for (i=0; i<n; i++) {
ip=indx[i];
sum=b[ip];
b[ip]=b[i];
if (ii>=0)
for (j=ii; j<=i-1; j++) sum -= a[i][j]*b[j];
else if (sum) ii=i;
b[i]=sum;
}
for (i=n-1; i>=0; i--) {
sum=b[i];
for (j=i+1; j<n; j++) sum -= a[i][j]*b[j];
b[i]=sum/a[i][i];
}
}

int *ivector(int nl,int nh)
{
int *v;
v=(int *)malloc((unsigned) (nh-nl+1)*sizeof(int));
if (!v) printf("allocation failure in ivector()");
return v-nl;
}

double *vector(int nl,int nh)
{
double *v;
v=(double *)malloc((unsigned) (nh-nl+1)*sizeof(double));
if (!v) printf("allocation failure in vector()");
return v-nl;
}

void free_vector(double *v,int nl,int nh)
{
free((char*) (v+nl));
}

double **matrix(int nrl,int nrh,int ncl,int nch)
{
int i;
double **m;
m=(double **)malloc((unsigned) (nch-ncl+1)*sizeof(double*));
if (!m) printf("allocation failure 1 in matrix()");
m -= nrl;

for (i=nrl; i<=nrh; i++) {
m[i]=(double *)malloc((unsigned) (nch-ncl+1)*sizeof(double));
if (!m[i]) printf("allocation failure 2 in matrix()");
m[i] -= ncl;
}
return m;
}
``````

I think it has to do with exponents because with smaller numbers everything is fine. thanks for any help! i would be so happy if it worked the way it's supposed to.

Jeff

-
Which matrix is it? `aa = [1/1134 2/1134; 3/11234 4/11234]` or what you call the original matrix at the top: `[1/1234 2/1234; 3/1234 4/1234]`? –  horchler Jul 6 '13 at 15:48
You may also want to use `aa\eye(size(aa))` rather than `inv` to calculate matrix inverses in Matlab/Octave. For 2-by-2 systems, however, there won't be any difference. –  horchler Jul 6 '13 at 15:51
@IonOne: I havent read your code, but the inverse of a 2x2 matrix is quite simple: mathsisfun.com/algebra/images/matrix-inverse-2x2.gif –  Amro Jul 6 '13 at 16:22
i'm sorry i made a mistake i messed up the datas. –  IonOne Jul 7 '13 at 11:21
the matrix i calculate isn't 2x2 it's more than that otherwise i wouldn't have to use complex functions. i change my post to match a good example –  IonOne Jul 7 '13 at 11:32
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