50

I'm trying to use a PriorityQueue to order objects using a Comparator.

This can be achieved easily, but the objects class variables (with which the comparator calculates priority) may change after the initial insertion. Most people have suggested the simple solution of removing the object, updating the values and reinserting it again, as this is when the priority queue's comparator is put into action.

Is there a better way other than just creating a wrapper class around the PriorityQueue to do this?

33

You have to remove and re-insert, as the queue works by putting new elements in the appropriate position when they are inserted. This is much faster than the alternative of finding the highest-priority element every time you pull out of the queue. The drawback is that you cannot change the priority after the element has been inserted. A TreeMap has the same limitation (as does a HashMap, which also breaks when the hashcode of its elements changes after insertion).

If you want to write a wrapper, you can move the comparison code from enqueue to dequeue. You would not need to sort at enqueue time anymore (because the order it creates would not be reliable anyway if you allow changes).

But this will perform worse, and you want to synchronize on the queue if you change any of the priorities. Since you need to add synchronization code when updating priorities, you might as well just dequeue and enqueue (you need the reference to the queue in both cases).

  • 1
    I see, so removing the object altering it and reinserting it IS the best option? – Marcus Whybrow Dec 9 '09 at 2:51
  • I believe so. Of course, this can only be done if the code doing the altering is aware of any queues the object is waiting in. – Thilo Dec 9 '09 at 3:00
  • Yes, this is the case in my case. – Marcus Whybrow Dec 9 '09 at 3:34
  • 10
    Removing from PQ is O(n), a faster solution is to-reimplement a fast heap like Fibonacci heap / binomial heap. Then when decreasing a key, you will be able to update the PQ. For this each node will have to get a pointer to its parent in order to percolate it up. Hard way, but faster. – Snicolas Dec 5 '13 at 11:10
10

I don't know if there is a Java implementation, but if you're changing key values alot, you can use a Fibonnaci heap, which has O(1) amortized cost to decrease a key value of an entry in the heap, rather than O(log(n)) as in an ordinary heap.

  • The JDK does not have a FibonacciHeap although it does exist from a third party. I know that once an object is added to my queue, it can only increase in priority, so does anyone know of an implementation with O(1) to swap two elements? such as the decrease functionality. Or can this be achieved easily with any implementation by swapping elements instead of with the PriorityQueue deleting and reinserting which would take O(1) and O(log(n)) respectively? – Marcus Whybrow Dec 9 '09 at 23:39
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    @MarcusWhybrow The Fibonnaci heap has constant amortized cost to decrease a key, but the constant in reality seems to be rather large. Your dataset have to be really large to make O(log n) worse than that constant. See Is there a standard Java implementation of a Fibonacci heap?. – Franklin Yu Dec 3 '18 at 1:57
5

It depends a lot on whether you have direct control of when the values change.

If you know when the values change, you can either remove and reinsert (which in fact is fairly expensive, as removing requires a linear scan over the heap!). Furthermore, you can use an UpdatableHeap structure (not in stock java though) for this situation. Essentially, that is a heap that tracks the position of elements in a hashmap. This way, when the priority of an element changes, it can repair the heap. Third, you can look for an Fibonacci heap which does the same.

Depending on your update rate, a linear scan / quicksort / QuickSelect each time might also work. In particular if you have much more updates than pulls, this is the way to go. QuickSelect is probably best if you have batches of update and then batches of pull opertions.

3

To trigger reheapify try this:

if(!priorityQueue.isEmpty()) {
    priorityQueue.add(priorityQueue.remove());
}
1

Something I've tried and it works so far, is peeking to see if the reference to the object you're changing is the same as the head of the PriorityQueue, if it is, then you poll(), change then re-insert; else you can change without polling because when the head is polled, then the heap is heapified anyways.

DOWNSIDE: This changes the priority for Objects with the same Priority.

0

One easy solution that you can implement is by just adding that element again into the priority queue. It will not change the way you extract the elements although it will consume more space but that also won't be too much to effect your running time.

To proof this let's consider dijkstra algorithm below

public int[] dijkstra() {
int distance[] = new int[this.vertices];
int previous[] = new int[this.vertices];
for (int i = 0; i < this.vertices; i++) {
    distance[i] = Integer.MAX_VALUE;
    previous[i] = -1;
}
distance[0] = 0;
previous[0] = 0;
PriorityQueue<Node> pQueue = new PriorityQueue<>(this.vertices, new NodeComparison());
addValues(pQueue, distance);
while (!pQueue.isEmpty()) {
    Node n = pQueue.remove();
    List<Edge> neighbours = adjacencyList.get(n.position);
    for (Edge neighbour : neighbours) {
        if (distance[neighbour.destination] > distance[n.position] + neighbour.weight) {
            distance[neighbour.destination] = distance[n.position] + neighbour.weight;
            previous[neighbour.destination] = n.position;
            pQueue.add(new Node(neighbour.destination, distance[neighbour.destination]));
        }
    }
}
return previous;

}

Here our interest is in line pQueue.add(new Node(neighbour.destination, distance[neighbour.destination])); I am not changing priority of the particular node by removing it and adding again rather I am just adding new node with same value but different priority. Now at the time of extracting I will always get this node first because I have implemented min heap here and the node with value greater than this (less priority) always be extracted afterwards and in this way all neighboring nodes will already be relaxed when less prior element will be extracted.

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