# Divide and Conquer Matrix Multiplication

I am having trouble getting divide and conquer matrix multiplication to work. From what I understand, you split the matrices of size nxn into quadrants (each quadrant is n/2) and then you do:

``````C11 = A11⋅ B11 + A12 ⋅ B21
C12 = A11⋅ B12 + A12 ⋅ B22
C21 = A21 ⋅ B11 + A22 ⋅ B21
C22 = A21 ⋅ B12 + A22 ⋅ B22
``````

My output for divide and conquer is really large and I'm having trouble figuring out the problem as I am not very good with recursion.

example output:

Original Matrix A:

``````4 0 4 3
5 4 0 4
4 0 4 0
4 1 1 1
``````

A x A

Classical:

``````44 3 35 15
56 20 24 35
32 0 32 12
29 5 21 17
``````

Divide and Conquer:

``````992 24 632 408
1600 272 720 1232
512 0 512 384
460 17 405 497
``````

Could someone tell me what I am doing wrong for divide and conquer? All my matrices are `int[][]` and classical method is the traditional 3 for loop matrix multiplication

• Why is it that you want to do matrix multiplication this way? If you are interested in raw performance there are numeric libraries available that I am sure would be faster than what you could write on your own in a reasonable amount of time. If you are interested in learning about numeric computing I would start with loop tiling (wikipedia has an article) instead of a recursive solution. – Samsdram Jan 31 '11 at 2:03
• its for homework. – Raptrex Jan 31 '11 at 2:11

You are recursively calling `divideAndConquer` in the wrong way. What your function does is square a matrix. In order for divide and conquer matrix multiplication to work, it needs to be able to multiply two potentially different matrixes together.

It should look something like this:

``````private static int[][] divideAndConquer(int[][] matrixA, int[][] matrixB){
if (matrixA.length == 2){
//calculate and return base case
}
else {
//make a11, b11, a12, b12 etc. by dividing a and b into quarters
//combine result quarters into one result matrix and return
}
}
``````

Some debugging approaches to try:

• Try some very simple test matrices as input (e.g. all zeros, with a one or a few strategic ones). You may see a pattern in the "failures" that will show you where your error(s) are.

• Make sure your "classical" approach is giving you correct answers. For small matrices, you can use Woflram Alpha on-line to test answers: http://www.wolframalpha.com/examples/Matrices.html

• To debug recursion: add `printf()` statements at the entry and exit of your function, including the invocation arguments. Run your test matrix, write the output to a log file, and open the log file with a text editor. Step through each case, writing your notes alongside in the editor making sure it's working correctly at each step. Add more `printf()` statements and run again if needed.

Good luck with the homework!

• my classical approach does give me the right answers. I'll try making a matrix of all 1s instead of 0 because I doubt that a matrix of 0s will work since adding or multiplying with 0 will be 0. – Raptrex Jan 31 '11 at 4:04
• Yes, a matrix of all zeros will give you zero. But add a FEW strategic ones, (like all in one column or row or diagonal) will give you some better tests. – payne Jan 31 '11 at 11:54

Could someone tell me what I am doing wrong for divide and conquer?

Yes:

``````   int[][] a = divideAndConquer(topLeft);
int[][] b = divideAndConquer(topRight);
int[][] c = divideAndConquer(bottomLeft);
int[][] d = divideAndConquer(bottomRight);

``````

You are going through an extra multiplication step here: you shouldn't be calling both `divideAndConquer()` and `classical()`.

What you are effectively doing is:

``````C11 = (A11^2)⋅(B11^2) + (A12^2)⋅(B21^2)
C12 = (A11^2)⋅(B12^2) + (A12^2)⋅(B22^2)
C21 = (A21^2)⋅(B11^2) + (A22^2)⋅(B21^2)
C22 = (A21^2)⋅(B12^2) + (A22^2)⋅(B22^2)
``````

which is not correct.

1. First, remove the `divideAndConquer()` calls, and replace a/b/c/d by topLeft/topRight/etc. See if it gives you the proper results.

2. Your `divideAndConquer()` method needs a pair of input parameters, so you can use A*B. Once you get that working, get rid of the calls to `classical()`, and use `divideAndConquer()` instead. (or save them for matrices that are not a multiple of 2 in length.)

You might find the Wiki article on Strassen's algorithm helpful.

• I will be implementing Strassens algorithm next, but I need divide and conquer as well. – Raptrex Jan 31 '11 at 1:59