3.0.0_release/doxygen/math__fce_8cc_source.html

 /*!
  *
  * Copyright (C) 2015 Technical University of Liberec.  All rights reserved.
  *
  * This program is free software; you can redistribute it and/or modify it under
  * the terms of the GNU General Public License version 3 as published by the
  * Free Software Foundation. (http://www.gnu.org/licenses/gpl-3.0.en.html)
  *
  * This program is distributed in the hope that it will be useful, but WITHOUT
  * ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS
  * FOR A PARTICULAR PURPOSE.  See the GNU General Public License for more details.
  *
  *
  * @file    math_fce.cc
  * @ingroup la
  * @brief   Auxiliary math functions.
  */

 #include <math.h>
 #include <stdio.h>           // for printf
 #include <ostream>           // for endl
 #include "system/logger.hh"  // for Logger, operator<<, Logger::MsgType, Log...

 #include "system/math_fce.h"


 static double Inverse2(SmallMtx2 a,SmallMtx2 b);
 static double Inverse3(SmallMtx3 a,SmallMtx3 b);
 static double Inverse4(SmallMtx4 a,SmallMtx4 b);

 //=============================================================================
 // LENGTH OF VECTOR
 //=============================================================================
 double vector_length( double v[] )
 {
     return  sqrt( v[0]*v[0]+v[1]*v[1]+v[2]*v[2] );
 }
 //=============================================================================
 // SCALAR PRODUCT OF VECTORS
 //=============================================================================
 double scalar_product( double u[], double v[] )
 {
     return u[0]*v[0]+u[1]*v[1]+u[2]*v[2];
 }
 //=============================================================================
 // NORMALIZE GIVEN VECTOR
 //=============================================================================
 void normalize_vector( double u[] )
 {
     double l;

     if ((l = vector_length( u )) < NUM_ZERO ) {
         WarningOut() << "Normalization of nearly zero vector." << std::endl;
     }
     u[0] /= l; u[1] /= l; u[2] /= l;
 }
 //=============================================================================
 // MULTIPLE VECTOR BY REAL NUMBER
 //=============================================================================
 void scale_vector( double u[], double k )
 {
     u[ 0 ] *= k; u[ 1 ] *= k; u[ 2 ] *= k;
 }

 //=============================================================================
 // VECTOR PRODUCT OF VECTORS
 //=============================================================================
 void vector_product( double u[], double v[], double x[] )
 {
     // u, v - inputs
     // x    - output, result

     x[ 0 ] = u[ 1 ] * v[ 2 ] - u[ 2 ] * v[ 1 ];
     x[ 1 ] = u[ 2 ] * v[ 0 ] - u[ 0 ] * v[ 2 ];
     x[ 2 ] = u[ 0 ] * v[ 1 ] - u[ 1 ] * v[ 0 ];
 }
 //=============================================================================
 // VECTOR DIFFERENCE OF VECTORS
 //=============================================================================
 void vector_difference( double u[], double v[], double x[] )
 {
   x[ 0 ] = u[ 0 ] - v[ 0 ];
   x[ 1 ] = u[ 1 ] - v[ 1 ];
   x[ 2 ] = u[ 2 ] - v[ 2 ];
 }

 /*************************************************
  *  SMALL MATRIX OPERATIONS
  *************************************************/

 /**************************************************
  * determinant 3x3
  * *************************/
 double Det3( SmallMtx3 a ) {
     return  a[0][0]*SUBDET2(1,2,1,2)
            -a[0][1]*SUBDET2(1,2,0,2)
            +a[0][2]*SUBDET2(1,2,0,1);
 }

 /*************************************************
  * Inverse of general small matrix with given size
  * a - input; b - output; returns determinant
  * ************************************************/
 double MatrixInverse(double *a, double *b, int size) {
     switch (size) {
         case 1:
             *b=1/(*a); return (*a);
         case 2:
             return ( Inverse2((SmallMtx2)a, (SmallMtx2)b) );
         case 3:
             return ( Inverse3((SmallMtx3)a, (SmallMtx3)b) );
         case 4:
             return ( Inverse4((SmallMtx4)a, (SmallMtx4)b) );
     }
     return 0.0;
 }


 /******************************************************************
  * Inverse of 2x2 matrix with determinant
  * a - input; b - output; returns determinant;
  * *****************************************************************/
 double Inverse2(SmallMtx2 a,SmallMtx2 b) {
   double Det;

   Det=SUBDET2(0,1,0,1);
   if ( fabs(Det) < NUM_ZERO ) return Det;
   b[0][0]=a[1][1]/Det;
   b[1][0]=-a[1][0]/Det;
   b[0][1]=-a[0][1]/Det;
   b[1][1]=a[0][0]/Det;
   return Det;
 }

 /******************************************************************
  * Inverse of 3x3 matrix with determinant
  * a - input; b - output; returns determinant;
  * *****************************************************************/

 double Inverse3(SmallMtx3 a,SmallMtx3 b) {
     double Det;

     b[0][0]=SUBDET2(1,2,1,2);
     b[1][0]=-SUBDET2(1,2,0,2);
     b[2][0]=SUBDET2(1,2,0,1);

     Det=a[0][0]*b[0][0]+a[0][1]*b[1][0]+a[0][2]*b[2][0];
     if ( fabs(Det)< NUM_ZERO) return Det;
     b[0][0]/=Det; b[1][0]/=Det; b[2][0]/=Det;

     b[0][1]=-SUBDET2(0,2,1,2)/Det;
     b[1][1]=SUBDET2(0,2,0,2)/Det;
     b[2][1]=-SUBDET2(0,2,0,1)/Det;

     b[0][2]=SUBDET2(0,1,1,2)/Det;
     b[1][2]=-SUBDET2(0,1,0,2)/Det;
     b[2][2]=SUBDET2(0,1,0,1)/Det;
     return Det;
 }

 /******************************************************************
  * Inverse of 4x4 matrix with determinant
  * a - input; b - output; det - determinant; returns determinant
  * *****************************************************************/

 double Inverse4(SmallMtx4 a,SmallMtx4 b) {
    double u[6], l[6], Det;
   // 2x2 subdets of rows 1,2
   u[0]=SUBDET2(0,1,0,1);
   u[1]=SUBDET2(0,1,0,2);
   u[2]=SUBDET2(0,1,0,3);
   u[3]=SUBDET2(0,1,1,2);
   u[4]=SUBDET2(0,1,1,3);
   u[5]=SUBDET2(0,1,2,3);

   //1x1 subdets of rows 2,3
   l[0]=SUBDET2(2,3,0,1);
   l[1]=SUBDET2(2,3,0,2);
   l[2]=SUBDET2(2,3,0,3);
   l[3]=SUBDET2(2,3,1,2);
   l[4]=SUBDET2(2,3,1,3);
   l[5]=SUBDET2(2,3,2,3);

   // 3x3 subdets
   b[0][0]=+a[1][1]*l[5]-a[1][2]*l[4]+a[1][3]*l[3];
   b[1][0]=-a[1][0]*l[5]+a[1][2]*l[2]-a[1][3]*l[1];
   b[2][0]=+a[1][0]*l[4]-a[1][1]*l[2]+a[1][3]*l[0];
   b[3][0]=-a[1][0]*l[3]+a[1][1]*l[1]-a[1][2]*l[0];
   // 4x4 det
   Det=a[0][0]*b[0][0]+a[0][1]*b[1][0]+a[0][2]*b[2][0]+a[0][3]*b[3][0];
   if ( fabs(Det)< NUM_ZERO) return Det;
   b[0][0]/=Det; b[1][0]/=Det; b[2][0]/=Det; b[3][0]/=Det;

   b[0][1]=(-a[0][1]*l[5]+a[0][2]*l[4]-a[0][3]*l[3])/Det;
   b[1][1]=(+a[0][0]*l[5]-a[0][2]*l[2]+a[0][3]*l[1])/Det;
   b[2][1]=(-a[0][0]*l[4]+a[0][1]*l[2]-a[0][3]*l[0])/Det;
   b[3][1]=(+a[0][0]*l[3]-a[0][1]*l[1]+a[0][2]*l[0])/Det;

   b[0][2]=(+a[3][1]*u[5]-a[3][2]*u[4]+a[3][3]*u[3])/Det;
   b[1][2]=(-a[3][0]*u[5]+a[3][2]*u[2]-a[3][3]*u[1])/Det;
   b[2][2]=(+a[3][0]*u[4]-a[3][1]*u[2]+a[3][3]*u[0])/Det;
   b[3][2]=(-a[3][0]*u[3]+a[3][1]*u[1]-a[3][2]*u[0])/Det;

   b[0][3]=(-a[2][1]*u[5]+a[2][2]*u[4]-a[2][3]*u[3])/Det;
   b[1][3]=(+a[2][0]*u[5]-a[2][2]*u[2]+a[2][3]*u[1])/Det;
   b[2][3]=(-a[2][0]*u[4]+a[2][1]*u[2]-a[2][3]*u[0])/Det;
   b[3][3]=(+a[2][0]*u[3]-a[2][1]*u[1]+a[2][2]*u[0])/Det;
   return Det;
 }

 /******************************************************************
  * Print a full matrix stored in a vector size x size
  * *****************************************************************/
 void PrintSmallMatrix(double *mtx, int size ) {
     int i,j;
     printf("matrix %d x %d :\n",size,size);
     for (i=0;i<size;i++) {
         for(j=0;j<size;j++) printf("%f ",mtx[i*size+j]);
         printf("\n");
     }
 }

 /*******************************************************************************
  *  at place inverse of an NxN matrix by Gauss-Jordan elimination without pivotation
  *  this should by faster then via adjung. matrix at least for N>3
  * *****************************************************************************/
 void MatInverse(int n,double **a) {
     int row,subrow,col;
     double Div,Mult;

     // forward run - lower triangle and diagonal of the inverse matrix
     for(row=0;row<n-1;row++) {
         // divide the row by diagonal
         Div=a[row][row];a[row][row]=1;
         for(col=0;col<n;col++) a[row][col]/=Div;
         // eliminate the lower part of column "row"
         for(subrow=row+1;subrow<n;subrow++) {
             Mult=a[subrow][row];a[subrow][row]=0;
             for(col=0;col<n;col++) a[subrow][col]-=a[row][col]*Mult;
         }
     }
     // divide the last row
     Div=a[row][row];a[row][row]=1;
     for(col=0;col<n;col++) a[row][col]/=Div;
     //backward run - upper trinagle
     for(;row>0;row--) {
         // eliminate the upper part of column "row"
         for(subrow=row-1;subrow>=0;subrow--) {
             Mult=a[subrow][row];a[subrow][row]=0;
             for(col=0;col<n;col++) a[subrow][col]-=a[row][col]*Mult;
         }
     }
 }

 //=============================================================================
 // solve equation system - gauss; returns 1 - one result 0 - system doesn't have result; 2 - oo results
 // !!! THIS FUNCTION IS NOT USED and probably is WRONG !!!
 //=============================================================================
 /*
 int gauss(double *A, double *B,int s,double *R)
 {
   int res=1,i,j,k,size;
   double koef,tmp,max;
   double *M;
   size=s+1;
   M = (double *) xmalloc( (size-1) * size * sizeof(double));
   for(i=0;i<s;i++)
   {
     for(j=0;j<s;j++)
       M[i*(size)+j]=A[i*s+j];
     M[i*(size)+j]=B[i];
   }
   for(i=0;i<size-1;i++)
   {
     if(M[i*size+i]==0)
     {
       for(j=i+1;j<size-1;j++)
       {
         if(M[j*size+i]!=0)
         {
           for(k=0;k<size;k++)
           {
              tmp=M[j*size+k];
              M[j*size+k]=M[i*size+k];
              M[i*size+k]=tmp;
           }
           j=size-1;
         }
       }
     }
     max=0;
     for(k=0;k<size;k++)
       if (fabs(max)<fabs(M[i*size+k])) max=fabs(M[i*size+k]);
     if (max!=0)
       for(k=0;k<size;k++)
         M[i*size+k]/=max;
     for(j=i+1;j<size-1;j++)
     {
       if (M[j*size+i]!=0)
       {
         koef=M[i*size+i]/M[j*size+i];
         koef=fabs(koef);
         if((M[i*size+i]>=0 && M[j*size+i]>=0) ||
            (M[i*size+i]<0 && M[j*size+i]<0)) koef*=-1;
         for(k=i;k<size;k++)
           M[j*size+k]=M[j*size+k]*koef + M[i*size+k];
 //        M[j*size+i] = 0;
       }
     }
   }
   for(i=size-1-1;i>=0;i--)
   {
     koef=0;
     for(j=i+1;j<size-1;j++)
     {
       koef=koef+R[j]*M[i*size+j];
     }
     if (!(DBL_EQ(M[i*size+i],0)))
       R[i]=(M[i*size + size-1]-koef)/M[i*size+i];
     else
     {
       if (koef==0 && M[i*size + size-1]==0)
         return 2;
       else
         return 0;
     }
   }
   xfree(M);
   return res;
 }
 */

 //=============================================================================
 // ANGLE BETWEEN TWO VECTORS
 // !!! THIS FUNCTION IS NOT USED !!!
 //=============================================================================
 /*
 double get_vectors_angle( double u[ 3 ], double v[ 3 ] )
 {
   double a,b,fi,p;
   a = scalar_product (u, v);
   b = vector_length( u ) * vector_length( v );
   p = a / b;
   if (p > 1) p = 1;
   if (p < -1) p = -1;
   fi = acos( p );
   return fi * 180 / M_PI;
 }
 */

 //=============================================================================
 // MATRIX TIMES MATRIX
 // !!! THIS FUNCTION IS NOT USED !!!
 //=============================================================================
 /*
 void matrix_x_matrix(double *A,int ra, int ca,
                      double *B, int rb, int cb, double *X)
 {
   int i,j,k;
   OLD_ASSERT(!(ca != rb),"Matrix A has different number of columns than matrix B rows in the function matrix_x_matrix()\n");
   for (i = 0; i < ra; i++)
     for (j = 0; j < cb; j++)
     {
       X[ i* cb + j] = 0;
       for (k = 0; k < rb; k++)
         X[ i * cb + j] += A[ i * ca + k] * B[ k * cb + j];
     }
   return;
 }
 */

 //-----------------------------------------------------------------------------
 // vim: set cindent:
vector_product
void vector_product(double u[], double v[], double x[])
Definition: math_fce.cc:68

Inverse3
static double Inverse3(SmallMtx3 a, SmallMtx3 b)
Definition: math_fce.cc:140

SUBDET2
#define SUBDET2(i, j, k, l)
Definition: math_fce.h:59

math_fce.h

SmallMtx3
SmallVec3_t * SmallMtx3
Definition: math_fce.h:31

SmallMtx4
SmallVec4_t * SmallMtx4
Definition: math_fce.h:32

normalize_vector
void normalize_vector(double u[])
Definition: math_fce.cc:48

vector_length
double vector_length(double v[])
Definition: math_fce.cc:34

scale_vector
void scale_vector(double u[], double k)
Definition: math_fce.cc:60

logger.hh

Inverse2
static double Inverse2(SmallMtx2 a, SmallMtx2 b)
Definition: math_fce.cc:123

scalar_product
double scalar_product(double u[], double v[])
Definition: math_fce.cc:41

MatInverse
void MatInverse(int n, double **a)
Definition: math_fce.cc:227

PrintSmallMatrix
void PrintSmallMatrix(double *mtx, int size)
Definition: math_fce.cc:214

NUM_ZERO
#define NUM_ZERO
Numerical helpers.
Definition: math_fce.h:41

SmallMtx2
SmallVec2_t * SmallMtx2
Definition: math_fce.h:30

Det3
double Det3(SmallMtx3 a)
Definition: math_fce.cc:94

MatrixInverse
double MatrixInverse(double *a, double *b, int size)
Definition: math_fce.cc:104

vector_difference
void vector_difference(double u[], double v[], double x[])
Definition: math_fce.cc:80

WarningOut
#define WarningOut()
Macro defining &#39;warning&#39; record of log.
Definition: logger.hh:246

Inverse4
static double Inverse4(SmallMtx4 a, SmallMtx4 b)
Definition: math_fce.cc:166

fmt::printf
void printf(BasicWriter< Char > &w, BasicCStringRef< Char > format, ArgList args)
Definition: printf.h:444