# Design a highly optimized datastructure to perform three operations insert, delete and getRandom

I just had a software interview. One of the questions was to design any datastructure with three methods insert, delete and getRandom in a highly optimized way. The interviewer asked me to think of a combination of datastructures to design a new one. Insert can be designed anyway but for random and delete i need to get the position of specific element. He gave me a hint to think about the datastructure which takes minimum time for sorting.

Any answer or discussion is welcomed....

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should getRandom return a random element or is it random access? –  SpacedMonkey Jun 27 '12 at 9:05
`typedef std::deque<sometype> datastructure_t;` Insert, random access, delete, got all covered. You're probably not going to need any faster than O(1). –  Damon Jun 27 '12 at 9:07
a random element should be returned.. –  Vikram Jun 27 '12 at 9:36
@Damon: deque has "linear time insertion and removal of elements in the middle" (sgi.com/tech/stl/Deque.html). So if one needs to remove an arbitrary element from the datastructure, it will be O(n). –  jrouquie Jun 27 '12 at 12:15

Let `t` be the type of the elements you want to store in the datastructure. Have an extensible array `elements` containing all the elements in no particular order. Have a hashtable `indices` that maps elements of type `t` to their position in `elements`.

• Inserting `e` means
• add `e` at the end of `elements` (i.e. push_back), get its position `i`
• insert the mapping `(e,i)` into `indices
• deleting `e` means
• find the position `i` of `e` in `elements` thanks to `indices`
• overwrite `e` with the last element `f` of `elements`
• update `indices`: remove the mapping `(f,indices.size())` and insert `(f,i)`
• drawing one element at random (leaving it in the datastructure, i.e. it's `peek`, not `pop`) is simply drawing an integer `i` in `[0,elements.size()[` and returning `elements[i]`.

Assuming the hashtable is well suited for your elements of type `t`, all three operations are O(1).

Be careful about the cases where there are 0 or 1 element in the datastructure.

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A tree might work well here. Order log(n) insert and delete, and choose random could also be log(n): start at the root node and at each junction choose a child at random (weighted by the total number of leaf nodes per child) until you reach a leaf.

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I think you mean a balanced BST else delete will take O(n) time. –  user674669 Oct 20 '12 at 18:59

The data structure which takes the least time for sorting is sorted array.

get_random() is binary search, so O(log n).

insert() and delete() involve adding/removing the element in question and then resorting, which is O(n log n), e.g. horrendous.

I think his hint was poor. You may have been in a bad interview.

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I understand "the datastructure which takes minimum time for sorting" as "a data structure used in a O(n log n) sorting algorithm". In which case a binary tree indeed allows all three operations to be performed in O(log n), as suggested by @AlexWilson. –  jrouquie Jun 27 '12 at 12:33

What I feel is that you can use some balaced version of tree like Red-Black trees. This will give O(log n) insertion and deletion time. For getting random element, may be you can have a additional hash table to keep track of elements which are in the tree structure.

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It might be Heap (data structure)

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