I've an adjacent matrix representing a graph.

```
M
1 2 3 4...
1 - 1 3 2
2 1 - 3 1
3 4 2 - 3
.
.
```

I want to perform Floyd's algorithm to calculate the shortest path between each pair of vertices.

And I can definitely iterate over them in a O(N3) complexity.

```
for ( i in 1 : n )
for ( j in 1 : n )
for ( k in 1 : n )
Floyd...
```

However when n = 10^3, R will not stand the iteration. So I'm looking for ways to perform floyd algorithm in matrix operations.

# Additional Reference

Thereotically, we can refer to MIT Isomap mat file.

But I'm still confused at **how to perform "repmat" in R**, which replicate the mat several times.

```
%%%%% Step 2: Compute shortest paths %%%%%
disp('Computing shortest paths...');
% We use Floyd's algorithm, which produces the best performance in Matlab.
% Dijkstra's algorithm is significantly more efficient for sparse graphs,
% but requires for-loops that are very slow to run in Matlab. A significantly
% faster implementation of Isomap that calls a MEX file for Dijkstra's
% algorithm can be found in isomap2.m (and the accompanying files
% dijkstra.c and dijkstra.dll).
tic;
for k=1:N
D = min(D,repmat(D(:,k),[1 N])+repmat(D(k,:),[N 1]));
if ((verbose == 1) & (rem(k,20) == 0))
disp([' Iteration: ', num2str(k), ' Estimated time to completion: ', num2str((N-k)*toc/k/60), ' minutes']);
end
end
```

`allShortestPaths`

function in the e1071 package? – Frank Aug 7 '13 at 7:18