Seems they both let you retrieve the minimum, which is what I need for Prim's algorithm, and force me to remove and reinsert a key to update its value. Is there any advantage of using one over the other, not just for this example, but generally speaking?
Generally speaking, it is less work to track only the minimum element, using a heap. A tree is more organized, and it requires more computation to maintain that organization. But if you need to access any key, and not just the minimum, a heap will not suffice, and the extra overhead of the tree is justified. 


Totally agree with Erickson on that priority queue only gives you the minimum/maximum element. In addition, because the priority queue is less powerful in maintaining the total order of the data, it has the advantage in some special cases. If you want to track the biggest M elements in an array of N, the time complexity would be O(NLogM) and the space would be O(M). But if you do it in a map, the time complexity is O(NlogN) and the space is O(N). This is quite fundamental while we must use priority queue in some cases for example M is just a constant like 10. 


It depends on how you implement you Priority Queue. According to Cormen's book 2nd ed the fastest result is with a Fibonacci Heap. 


One of the differences is that remove(Object) and contains(Object) are linear O(N) in a normal heap based PriorityQueue (like Oracle's), but O(log(N)) for a TreeSet/Map. So if you have a large number of elements and do a lot of remove(Object) or contains(Object), then a TreeSet/Map may be faster. 


Rule of thumb about it is: TreeMap maintains all elements orderly. (So intuitively, it takes time to construct it) PriorityQueue only quarantine min or max. It's less expensive but less powerful. 


TreeMap
does not require you to remove and reinsert a key to update its value. Aput(key, value)
call will update the value for a key if it (or an "equal" key value) is already in the map. – Stephen C Aug 19 '10 at 18:28