First your description seems to be of an adjacency matrix except you're saying `m`

by `n`

. Adjacency matrices are always square, so we must assume `m==n`

. The matrix elements are the edge weights.

An adjacency list representation of a graph is (usually) an array `adj`

of sets of pairs. The set `adj[i]`

contains pair `<j, w>`

iff there is a directed edge `i--w-->j`

, i.e. from vertex `i`

to `j`

with weight `w`

in the represented graph.

With this definition, it's clear you must start with `n`

empty adjacency sets `adj[i]`

and then iterate over the matrix elements `m[i][j] = w`

. For each of these add `<j, w>`

to `adj[i]`

.

The java code for this is pretty trivial, so I won't write it. The type for a graph represented with adjacency lists is something like `ArrayList<HashMap<Integer, Integer>> adjacencies`

. The pairs `<j,w> in adj[i]`

are mappings `j -> w`

stored in the hash table `adjacencies.get(i)`

. The code to create such an adjacency will be `adjacencies.get(i).put(j, w)`

.

This method allows you to iterate over the vertices adjacent to `i`

by iterating over keys in the hash table `adjacencies.get(i)`

, look up the weight of a given edge `i--w-->j`

with `w = adjacencies.get(i).get(j)`

, and so on for all the usual graph operations.

`int[][]`

, where the first index is the index of the node and the values stored there are the destination nodes. If the topology is fixed, this is sufficient, if not, you may consider using some implementation of List. – Jiri Kremser Feb 9 '13 at 1:31