# Looking for an efficient way to find a sorted order from 2 lists

I have 2 set of unsorted integers: set A and set B. But we don't know how many items are there in setB in advance.

I need to :

``````while setA and setB are not empty:
pop the smallest no from setA
move an int from setB to setA
``````

What is the most efficient way to do that in Java?

I am thinking

1. create an ArrayList for setA and LinkedList for setB
2. while (setA and setB are not empty) sort(setA) pop setA remove an integer from setB and insert in setA

Is there a better way to do this in Java? I would like to remove the 'sort in the while loop' if possible.

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the problem is not clear. why do we need to move int from B to A? what's the purpose of all this operation? o_O –  Vladimir Dyuzhev Sep 24 '09 at 4:18

``````TreeSet<Integer> setA = new TreeSet<Integer>(listA);
TreeSet<Integer> setB = new TreeSet<Integer>(listB);
while (!setA.isEmpty()) {
setA.remove(setA.first());
if (!setB.isEmpty()) {
Integer first = setB.first();
setB.remove(first);
}
}
``````

Explanation: the TreeSet class maintains the set in a red-black tree that is ordered on the natural ordering of the set elements; i.e. the `Integer.compareTo()` method in this case. Adding or removing an element finds the appropriate place in the tree for the element, and then adds or removes it without the need to sort.

The `isEmpty` method is O(1), and the `first`, `add` and `remove` methods are all O(log N), where each has to be called O(N) times. Creating the initial treesets is also O(N log N). So the overall complexity is going to be O(N log N) where N is the total list size.

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Seems like there's no requirement that items are removed from setB in order, so you can avoid creating a new TreeSet and just use an Iterator through setB, removing items as they are retrieved. –  Ken Sep 24 '09 at 3:31
@Ken: True ... but on the other hand it is not clear from the question if the inputs are really sets of indeterminate order (e.g. HashSets) or lists. In the former case, making a 'setB' a TreeSet results in a more predictable result. –  Stephen C Sep 24 '09 at 6:52

Here's what I understood from the question: We need one sorted collection that contains all elements from both setA and setB. Because setA and setB may contain equal items, we should use a list (preserves duplicates). If we don't want duplicates, just exchange ArrayList by TreeSet and remove the extra sorting.

I assume, that both sets contain the same type of elements - if not, we can still use Collections.sort but have to push a Comparator to the sort method that is capable of comparing different types of objects.

``````private Collection<Integer> combineAndSort(Set<Integer>...sets) {
Collection<Integer> sorted = new ArrayList<Integer>();
// Collection<Integer> sorted = new TreeSet<Integer>();
for(Set<Integer> set:sets) {
}
Collections.sort(sorted); // obsolete if using TreeSet
}
``````
-
@Andreas: while I don't understand the rationale of the OP's algorithm, your code does not do the same thing as his algorithm. –  Stephen C Sep 24 '09 at 6:58
Yes, the easiest way to demonstrate the discrepancy is with a non-empty A and an empty B. The original algorithm will not iterate at all, while yours will. –  Dilum Ranatunga Sep 24 '09 at 7:36
agreed - I wasn't sure that his algorithm would solve the problem, so I decided to stick to the problem that was given in the questions headline ;) –  Andreas_D Sep 24 '09 at 17:53

If you are using Java 5 onwards, consider `java.util.PriorityQueue`:

``````Collection<Integer> setA = ...;
Collection<Integer> setB = ...;
if (setA.isEmpty()) {
// if A is empty, no need to go on.
return;
}
PriorityQueue<Integer> pq = new PriorityQueue<Integer>(setA);
// no need to check if A is empty anymore: starting off non-empty,
// and for each element we remove, we move one over from B.
while (iterB.hasNext()) {
int smallest = pq.poll();
doStuffWithSmallest(smallest);
``````private <T> T removeOne(ArrayList<T> array) throws IndexOutOfBoundsException {