Marlin: comparison MatrixMath.cpp

--1:000000000000
+:2c8ba1964db7
+/*
+*  MatrixMath.cpp Library for MatrixMath
+*
+*  Created by Charlie Matlack on 12/18/10.
+*  Modified from code by RobH45345 on Arduino Forums, taken from unknown source.
+*  MatrixMath.cpp
+*/
+#include "Marlin.h"
+#include "MatrixMath.h"
+#define NR_END 1
+MatrixMath::MatrixMath()
+{
+}
+// Matrix Printing Routine
+// Uses tabs to separate numbers under assumption printed float width won't cause problems
+void MatrixMath::MatrixPrint(float* A, int m, int n, String label){
+	// A = input matrix (m x n)
+	int i,j;
+	SERIAL_ECHOLN(' ');
+	SERIAL_ECHOLN(label);
+	for (i=0; i<m; i++){
+		for (j=0;j<n;j++){
+			serialPrintFloat(A[n*i+j]);
+			SERIAL_ECHO("\t");
+		}
+		SERIAL_ECHOLN(' ');
+	}
+}
+void MatrixMath::MatrixCopy(float* A, int n, int m, float* B)
+{
+	int i, j, k;
+	for (i=0;i<m;i++)
+		for(j=0;j<n;j++)
+		{
+			B[n*i+j] = A[n*i+j];
+		}
+}
+//Matrix Multiplication Routine
+// C = A*B
+void MatrixMath::MatrixMult(float* A, float* B, int m, int p, int n, float* C)
+{
+	// A = input matrix (m x p)
+	// B = input matrix (p x n)
+	// m = number of rows in A
+	// p = number of columns in A = number of rows in B
+	// n = number of columns in B
+	// C = output matrix = A*B (m x n)
+	int i, j, k;
+	for (i=0;i<m;i++)
+		for(j=0;j<n;j++)
+		{
+			C[n*i+j]=0;
+			for (k=0;k<p;k++)
+				C[n*i+j]= C[n*i+j]+A[p*i+k]*B[n*k+j];
+		}
+}
+//Matrix Addition Routine
+void MatrixMath::MatrixAdd(float* A, float* B, int m, int n, float* C)
+{
+	// A = input matrix (m x n)
+	// B = input matrix (m x n)
+	// m = number of rows in A = number of rows in B
+	// n = number of columns in A = number of columns in B
+	// C = output matrix = A+B (m x n)
+	int i, j;
+	for (i=0;i<m;i++)
+		for(j=0;j<n;j++)
+			C[n*i+j]=A[n*i+j]+B[n*i+j];
+}
+//Matrix Subtraction Routine
+void MatrixMath::MatrixSubtract(float* A, float* B, int m, int n, float* C)
+{
+	// A = input matrix (m x n)
+	// B = input matrix (m x n)
+	// m = number of rows in A = number of rows in B
+	// n = number of columns in A = number of columns in B
+	// C = output matrix = A-B (m x n)
+	int i, j;
+	for (i=0;i<m;i++)
+		for(j=0;j<n;j++)
+			C[n*i+j]=A[n*i+j]-B[n*i+j];
+}
+//Matrix Transpose Routine
+void MatrixMath::MatrixTranspose(float* A, int m, int n, float* C)
+{
+	// A = input matrix (m x n)
+	// m = number of rows in A
+	// n = number of columns in A
+	// C = output matrix = the transpose of A (n x m)
+	int i, j;
+	for (i=0;i<m;i++)
+		for(j=0;j<n;j++)
+			C[m*j+i]=A[n*i+j];
+}
+//Matrix Inversion Routine
+// * This function inverts a matrix based on the Gauss Jordan method.
+// * Specifically, it uses partial pivoting to improve numeric stability.
+// * The algorithm is drawn from those presented in
+//	 NUMERICAL RECIPES: The Art of Scientific Computing.
+// * The function returns 1 on success, 0 on failure.
+// * NOTE: The argument is ALSO the result matrix, meaning the input matrix is REPLACED
+int MatrixMath::MatrixInvert(float* A, int n)
+{
+	// A = input matrix AND result matrix
+	// n = number of rows = number of columns in A (n x n)
+	int pivrow;		// keeps track of current pivot row
+	int k,i,j;		// k: overall index along diagonal; i: row index; j: col index
+	int pivrows[n]; // keeps track of rows swaps to undo at end
+	float tmp;		// used for finding max value and making column swaps
+	for (k = 0; k < n; k++)
+	{
+		// find pivot row, the row with biggest entry in current column
+		tmp = 0;
+		for (i = k; i < n; i++)
+		{
+			if (abs(A[i*n+k]) >= tmp)	// 'Avoid using other functions inside abs()?'
+			{
+				tmp = abs(A[i*n+k]);
+				pivrow = i;
+			}
+		}
+		// check for singular matrix
+		if (A[pivrow*n+k] == 0.0f)
+		{
+			SERIAL_ECHOLNPGM("Inversion failed due to singular matrix");
+			return 0;
+		}
+		// Execute pivot (row swap) if needed
+		if (pivrow != k)
+		{
+			// swap row k with pivrow
+			for (j = 0; j < n; j++)
+			{
+				tmp = A[k*n+j];
+				A[k*n+j] = A[pivrow*n+j];
+				A[pivrow*n+j] = tmp;
+			}
+		}
+		pivrows[k] = pivrow;	// record row swap (even if no swap happened)
+		tmp = 1.0f/A[k*n+k];	// invert pivot element
+		A[k*n+k] = 1.0f;		// This element of input matrix becomes result matrix
+		// Perform row reduction (divide every element by pivot)
+		for (j = 0; j < n; j++)
+		{
+			A[k*n+j] = A[k*n+j]*tmp;
+		}
+		// Now eliminate all other entries in this column
+		for (i = 0; i < n; i++)
+		{
+			if (i != k)
+			{
+				tmp = A[i*n+k];
+				A[i*n+k] = 0.0f;  // The other place where in matrix becomes result mat
+				for (j = 0; j < n; j++)
+				{
+					A[i*n+j] = A[i*n+j] - A[k*n+j]*tmp;
+				}
+			}
+		}
+	}
+	// Done, now need to undo pivot row swaps by doing column swaps in reverse order
+	for (k = n-1; k >= 0; k--)
+	{
+		if (pivrows[k] != k)
+		{
+			for (i = 0; i < n; i++)
+			{
+				tmp = A[i*n+k];
+				A[i*n+k] = A[i*n+pivrows[k]];
+				A[i*n+pivrows[k]] = tmp;
+			}
+		}
+	}
+	return 1;
+}
+void MatrixMath::MatrixIdentity(float* A, int m, int n)
+{
+	int i, j;
+	for (i=0;i<m;i++)
+		for(j=0;j<n;j++)
+			A[n*i+j]=i==j?1:0;
+}
+MatrixMath matrixMaths; //instance

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comparison: MatrixMath.cpp

MatrixMath.cpp