# Data structure that supports the following in O(1) time: initialization, insertion, deletion, finding an element, deleting all elements

Interview Question:

Propose a data structure that holds elements from 0 to n − 1 and supports all of the following operations in O(1) time: initialization, insertion of an element, deletion of an element, finding an element, deleting all elements.

A hash table (assume there are no collisions i.e the best case) would support insertion and search in O(1). I am not sure about deletion though...any ideas?

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## 3 Answers

Very interesting question!

Assuming memory allocation and dealloaction is O(1), then an O(1) is possible for all.

For this we use the trick by Hopcroft and Ullman which allows us to use arrays of size n, without having to spend Omega(n) time in actually initializing them.

On insert, we just use the above array and set it to 1. On a search, if we find that the array element is not initialized, we return 0. On a delete, we set it to 0.

On a delete all, we free the datastructure and use a new one.

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How the search operation will be O(1) when we don't know which index the search value is residing? – cyber_raj Oct 3 '11 at 12:51
@cyber_raj: The array is just like any other array, except we know in O(1) time, if we are accessing an uninitialized element and in that case, we can return the default initialization value. I suggest you read point 1 in the section "Solution" in the above blog link. – user127.0.0.1 Oct 3 '11 at 16:05
What if at the very start, when from[] and to[] are uninitialized, they contain garbage data that fulfills the requirements necessary to assert that vec[i] has been set? It's a rare edge case, but isn't it technically possible? – John Kurlak Jul 27 '13 at 5:28
@JohnKurlak: You also maintain a count of how many you have set, so that count will be zero. – user127.0.0.1 Sep 10 '13 at 17:57

OK i think if the N is within rage you can just declare an array of N elements

``````0)Initialize
memset(A,0,sizeof(A))

1) Insert i
A[i] = 1

2) Remove i
A[i] = 0

3) Find i
if( A[i] )

4) Delete All
memset(A,0,sizeof(A))
``````
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bool allDelete = true? – user7 Oct 2 '11 at 17:31
thank you for your answer...it makes sense..but is memset an O(1) operation? – user7 Oct 2 '11 at 18:00
I think we should assume that memset() is not an O(1) operation. – John Kurlak Jul 27 '13 at 5:08

Hash Table can be O(1) for delete.

``````List<Object> hashTableData = new ArrayList<Object>();
``````

Edit: the code is a possible implementation of the data stored for the Hash Table.

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I am not a Java programmer, so speaking generically a hash table is usually an array of pointers to linked lists coupled with a really good hashing function...so to delete all the elements from a hash table, one would have to first free each linked list...isn't this an O(n) operation – user7 Oct 2 '11 at 17:59
Note that you included "assume that there are no collisions". It depends on how it is implemented. If you have an array of stuff and use a hash function to get the index of the stuff you want and the hash function is not creating duplicates then you don't need the linked lists, just the array. – DwB Oct 2 '11 at 18:03
I guess you are right. Insertion, removal, and lookup should take expected O(1) time, provided that the hash function is sufficiently "random". But is initialization and deleting all elements O(1) even if there are no collisions? – user7 Oct 3 '11 at 15:12