If you're using the Sun implementation, it's From the Javadocs:
Implementation note: this implementation provides
O(log(n)) time for the enqueing and dequeing methods
linear time for the
methods; and constant time for the retrieval methods
Other implementations could have different complexity.
Edit: The Javadocs don't cover the performance of removing an element with an iterator, so I had to look up the source code. This is all relevant to the Sun implementation, and may differ in Apple's version, GNU Classpath, etc. Sun's source is available here; it is also included in the JDK, so you might already have it installed.
PriorityQueue's iterator, the default case for
remove() is to call
lastRet is the index that was last returned by
removeAt() appears to be
O(log(n)) worst case (it might have to sift the queue, but doesn't have to iterate).
However, sometimes bad things happen. From the comments of
* Removes the ith element from queue.
* Normally this method leaves the elements at up to i-1,
* inclusive, untouched. Under these circumstances, it returns
* null. Occasionally, in order to maintain the heap invariant,
* it must swap a later element of the list with one earlier than
* i. Under these circumstances, this method returns the element
* that was previously at the end of the list and is now at some
* position before i. This fact is used by iterator.remove so as to
* avoid missing traversing elements.
When a non-null element is returned by
removeAt(), the iterator adds it to a special queue for later use: when the iterator runs out of elements in the queue, it then iterates through this special queue. When
remove() is called during this second phase of iteration, the iterator calls
lastRetElt is the last element returned from the special queue.
removeEq is forced to use a linear search to find the correct element to remove, which makes it
O(n). BUT it can check elements using
== rather than
.equals(), so its constant factor is lower than
So, in other words, removing with an iterator is technically
O(n), but in practice it should be quite a bit faster than