Which datatype to use as queue in Dijkstra's algorithm?

I'm trying to implement Dijkstra's algorithm in Java (self-study). I use the pseudo-code provided by Wikipedia (link). Now near the end of the algorithm, I should `decrease-key v in Q;`. I guess i should have implemented Q with a BinaryHeap or something like that? What would be the right (built-in) datatype to use here?

``````private void dijkstra(int source) {

for (int i = 0; i < this.adjacencyMatrix.length; i++) {
dist[i] = this.INFINITY;
previous[i] = this.UNDEFINED;
}

dist[source] = 0;

while(!q.isEmpty()) {
// get node with smallest dist;
int u = 0;
for(int i = 0; i < this.adjacencyMatrix.length; i++) {
if(dist[i] < dist[u])
u = i;
}

// break if dist == INFINITY
if(dist[u] == this.INFINITY) break;

// remove u from q
q.remove(u);

for(int i = 0; i < this.adjacencyMatrix.length; i++) {
// in a unweighted graph, this.adjacencyMatrix[u][i] always == 1;
int alt = dist[u] + this.adjacencyMatrix[u][i];
if(alt < dist[i]) {
dist[i] = alt;
previous[i] = u;

// here's where I should "decrease the key"
}
}
}
}
}
``````
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You really should use `q` to get the node with smallest dist, or there is no point in doing `decrease-key v in Q;` anyway. –  Ishtar Jun 7 '11 at 15:25

Priority Queue as per the wiki article. Which suggests that the classic implementation now is to use a "min-priority queue implemented by a Fibonacci heap."

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Is using Fibonacci heap always better? –  A2B Jun 7 '11 at 15:16
Green Code: In learning about Dijkstra's it is probably over kill, unless you also wish to learn about implementation of a Fibonacci heap. So in light of learning it's probably not better, in terms of actual performance it would appear to be. –  zellio Jun 7 '11 at 15:59
I will give this one a try. Implementing a Fibonacci heap should be fun as well :-) –  Dänu Jun 7 '11 at 17:01
As other answers mentioned, Java's PriorityQueue doesn't include DecreaseKey, which is needed. So the real answer is that there's no right built in type to use in Java. –  maayank Feb 25 '13 at 17:55
@maayank: Upvote for giving the precise answer. –  arunmoezhi Nov 19 '13 at 3:10
show 1 more comment

The simplest way is to use a priority queue and not to care about the previously added key in the priority queue. This means you will have each node multiple times in the queue, but this does not hurt the algorithm at all. If you have a look at it, all versions of the node which have been replaced will be picked up later and by then the closest distance will already have been determined.

The check `if alt < dist[v]:` from the wikipedia is what makes this work. The runtime will only degrade a little from this, but if you need the very fast version you have to optimize further.

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Makes sense, yeah. Thank you. –  Dänu Jun 7 '11 at 17:03
Excellent observation. This saved me from rolling my own priority queue. –  wcochran Nov 8 '12 at 4:42

The suggested `PriorityQueue` does not provide a decrease-key operation. However, it can be emulated by removing the element and then reinserting it with the new key. This should not increase the asymptotic run time of the algorithm, although it could be made slightly faster with built-in support.

EDIT: This does increase the asymptotic run time, as decrease-key is expected to be `O(log n)` for a heap but `remove(Object)` is `O(n)`. It appears there isn't any built-in priority queue in Java with support for an efficient decrease-key.

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Thank you for this one. I think the Apache Commons contain one.. however, I'm going to implement one by myself.. :-) –  Dänu Jun 7 '11 at 17:02