# Can we find mode of an array without hashmap in un sorted array in O(n) time

Can we find the mode of an array in `O(n)` time without using Additional `O(n)` space, nor Hash. Moreover the data is not sorted?

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define mode of an array –  DarthVader Dec 2 '12 at 19:32
@DarthVader - It's standard terminology. It means the number that occurs most often. There can be more than one. –  Ted Hopp Dec 2 '12 at 19:33
@ShinTakezou The linked question is about sorted arrays. –  Omri Barel Dec 2 '12 at 19:36
yep.. i m sorry.. i meant O(n) time. –  user1540945 Dec 2 '12 at 19:39
If the array is unsorted and you cannot use hashing of any kind, I think this is impossible. See this thread, for example. –  Ted Hopp Dec 2 '12 at 19:40

Just count the frequencies. This is not `O(n)` space, it is `O(k)`, with k being the number of distinct values in the range. This is actually constant space.

Time is clearly linear O(n)

``````//init
counts = array[k]
for i = 0 to k
counts[i] = 0

maxCnt = 0
maxVal = vals[0]
for val in vals
counts[val]++
if (counts[val] > maxCnt)
maxCnt = counts[val]
maxVal = val
``````

The main problem here, is that while k may be a constant, it may also be very very huge. However, k could also be small. Regardless, this does properly answer your question, even if it isn't practical.

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I dont understand what you mean by "this is actually constant space". How? IMO it's still linear only on different variable. and we can say that k <= n –  Honza Brabec Dec 2 '12 at 21:08
Because k doesn't change depending on the size of the input n. And no, `k <= n` is not true. For example, if were talking about an array of 32 bit ints, then k = 2^32 regardless of n. n could be 5 and k is still enormous. And, k remains the same if n is 1 trillion. –  rambo coder Dec 2 '12 at 21:17
Oh, now I see how you meant it. Basically the same approach as in counting sort. I thought that you'd create new entries in the memory only when you find a new unique item but that would require a hashmap to run in linear time and that is forbidden so my mistake :) Now there is a problem however if the entries are for example strings of arbitrary length. –  Honza Brabec Dec 2 '12 at 21:58

The problem is not easier then Element distinctness problem1 - so basically without the additional space - the problem's complexity is `Theta(nlogn)` at best (and since it can be done in `Theta(nlogn)` - it is ineed the case).

So basically - if you cannot use extra space for the hash table, best is sort and iterate, which is `Theta(nlogn)`.

(1) Given an algorithm A that runs in `O(f(n))` for this problem, it is easy to see that one can run A and then verify that the resulting element repeats more then once with an extra iteration to solve the element distinctness problem in `O(f(n) + n)`.

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