Javascript Program for Kronecker Product of two matrices
Given a matrix A and a matrix B, their Kronecker product C = A tensor B, also called their matrix direct product, is an matrix.
A tensor B = |a11B a12B| |a21B a22B| = |a11b11 a11b12 a12b11 a12b12| |a11b21 a11b22 a12b21 a12b22| |a11b31 a11b32 a12b31 a12b32| |a21b11 a21b12 a22b11 a22b12| |a21b21 a21b22 a22b21 a22b22| |a21b31 a21b32 a22b31 a22b32|
Examples:
1. The matrix direct(kronecker) product of the 2×2 matrix A and the 2×2 matrix B is given by the 4×4 matrix : Input : A = 1 2 B = 0 5 3 4 6 7 Output : C = 0 5 0 10 6 7 12 14 0 15 0 20 18 21 24 28 2. The matrix direct(kronecker) product of the 2×3 matrix A and the 3×2 matrix B is given by the 6×6 matrix : Input : A = 1 2 B = 0 5 2 3 4 6 7 3 1 0 Output : C = 0 5 2 0 10 4 6 7 3 12 14 6 0 15 6 0 20 8 18 21 9 24 28 12 0 5 2 0 0 0 6 7 3 0 0 0
Below is the code to find the Kronecker Product of two matrices and stores it as matrix C :
Javascript
<script> // Javascript code to find the Kronecker Product of // two matrices and stores it as matrix C // rowa and cola are no of rows and columns // of matrix A // rowb and colb are no of rows and columns // of matrix B let cola = 2, rowa = 3, colb = 3, rowb = 2; // Function to computes the Kronecker Product // of two matrices function Kroneckerproduct(A, B) { let C= new Array(rowa * rowb) for (let i = 0; i < (rowa * rowb); i++) { C[i] = new Array(cola * colb); for (let j = 0; j < (cola * colb); j++) { C[i][j] = 0; } } // i loops till rowa for (let i = 0; i < rowa; i++) { // k loops till rowb for (let k = 0; k < rowb; k++) { // j loops till cola for (let j = 0; j < cola; j++) { // l loops till colb for (let l = 0; l < colb; l++) { // Each element of matrix A is // multiplied by whole Matrix B // resp and stored as Matrix C C[i + l + 1][j + k + 1] = A[i][j] * B[k][l]; document.write( C[i + l + 1][j + k + 1]+ " " ); } } document.write( "</br>" ); } } } let A = [ [ 1, 2 ], [ 3, 4 ], [ 1, 0 ] ]; let B = [ [ 0, 5, 2 ], [ 6, 7, 3 ] ]; Kroneckerproduct(A, B); </script> |
Output :
0 5 2 0 10 4 6 7 3 12 14 6 0 15 6 0 20 8 18 21 9 24 28 12 0 5 2 0 0 0 6 7 3 0 0 0
Time Complexity: O(rowa*rowb*cola*colb), as we are using nested loops.
Auxiliary Space: O((rowa + colb)*(rowb + cola)), as we are using extra space in matrix C.
Please refer complete article on Kronecker Product of two matrices for more details!