# Traversing through an adjacency matrix for Prim's MST algorithm

I have a problem with traversing through a weighted adjacency matrix with Java. What I'm trying to do is get the weight of the minimum spanning tree from the matrix, using Prim's algorithm.

The code I have so far is the following:

``````public int findPrim(int[][] matrix) {

ArrayList<Integer> checkThese = new ArrayList<>();
boolean[] checked = new boolean[graph.vertexCount()];
int w=0;
int column=0;
int row=0;
int smallest=0;

for(Iterator<Integer> it = checkThese.Iterator();it.hasNext();) {

smallest = Integer.MAX_VALUE;
for (int k=0;k<graph.vertexCount();k++) {

if ((matrix[r][k] < smallest) && matrix[r][k] !=0 && !checked[k-1]) {

smallest = matrix[r][k];
column = k;
}
}

if (smallest != Integer.MAX_VALUE) {
w += smallest;
checked[column]=true;
}
}

return w;
}
``````

I know how traversing through the matrix is supposed to work on paper, but I'm having a problem with the implementation. More specifically, since I need to update `checkThese` while iterating through the list, I understand that I need to use an iterator for it, like I've tried doing. However, now the problem is that I can't figure out a way to get the `r` coordinate for the matrix, which I need later on. The method is missing a couple of other things too, but my main concern is how I can traverse through the matrix while updating the list of matrix rows I'm checking.

My adjacency matrix is in the form of

``````    A B C D E
A   0 4 2 8 0
B   0 0 5 6 7
C   0 0 0 9 3
D   0 0 0 0 1
E   0 0 0 0 0
``````

The plan is to start with row `A` and choose the smallest edge (2). After that I would exclude column `C` from consideration, and next check rows `A` and `C` and so forth until I've excluded all columns, thus checking all the edges.

-

You need another nested loop to get it to work the way that you've indicated. Here's the corrected pseudocode.

``````let n be the number of vertices
initialize cost <- 0
initialize checkThese <- [0]
initialize checked <- [true, false, ..., false] (length n)
repeat n - 1 times (alternatively, test for termination as indicated)
smallest <- infinity
argSmallest <- null
for v in checkThese
for w from 0 to n - 1
let cost = matrix[min(v, w)][max(v, w)]
if not checked[w] and cost < smallest then
smallest <- cost
argSmallest <- w
end if
end for
end for
(break here if argSmallest is null)
cost <- cost + smallest
checked[argSmallest] <- true
end repeat
``````

This is not an especially efficient realization of Prim's algorithm. To speed it up from O(n^3) to O(n^2), the asymptotic optimum for dense matrices, you can maintain another n-element array of integers, call it `minCost`. The entry at index `w` is the minimum cost of an edge from a checked vertex to `w`. The revised pseudocode looks like this.

``````let n be the number of vertices
initialize cost <- 0
initialize checked <- [true, false, ..., false] (length n)
initialize minCost <- [0, infinity, ..., infinity] (length n)
repeat n - 1 times (alternatively, test for termination as indicated)
smallest <- infinity
argSmallest <- null
for w from 0 to n - 1
if not checked[w] and minCost[w] < smallest then
smallest <- minCost[w]
argSmallest <- w
end if
end for
(break here if argSmallest is null)
cost <- cost + smallest
checked[argSmallest] <- true
minCost[argSmallest] <- 0
for v from 0 to n - 1
let cost = matrix[min(argSmallest, v)][max(argSmallest, v)]
if not checked[v] and cost < minCost[v] then
minCost[v] <- cost
end if
end for
end repeat
``````

If all of the edge costs are positive, then you can replace the test `checked[w]` with `minCost[w] > 0` and do away with the `checked` array. You also could fuse the two loops.

-
Thank you for the response. Could you clarify the line `let cost = matrix[min(v, w)][max(v, w)]` though? I'm not certain I'm understanding the syntax correctly there. – user1290164 Mar 30 '14 at 19:33
To add to my previous comment, if it means that I'm to choose the minimum from `v` and `w` for the row and maximum for the column, then I think I'd by running into the same problem as to how to get the value for the `v` attribute, if I'm implementing `for v in checkThese` with an iterator. – user1290164 Mar 30 '14 at 19:44
@user1290164 I mean that, since you've stored the entries for the matrix above the main diagonal but not symmetrically below, you need to swap the indices if they're in the wrong order. – David Eisenstat Mar 30 '14 at 19:51