Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

Given a set integers, the problem consists of finding the number of possible arithmetic series of length 3. The set of integers may or may not be sorted.

I could implement a simple bruteforce algorithm taking time O(n^3) but time efficiency is important and the set of integers can be as large as 10^5. This means bruteforce obviously won't work. Can anyone suggest some algorithm/pseudocode/code in c++?

An example: there are 4 numbers 5,2,7,8 . Clearly there is only one such possibility - (2,5,8) in which the common difference is 3, so our answer is 1.

EDIT:I forgot to mention one important property - each number of set given is between 1 to 30000 (inclusive).

share|improve this question
guess is that we sort numbers in O(n log n) and remove duplicacy , but removing duplicacy can be used just as optimization , not as actual algorithm . But i think solution revolves somewhere around here , the problem becomes interesting due to its constraints . – Maggi Iggam Nov 10 '12 at 18:29
Sounds familiar : – axiom Nov 10 '12 at 18:36
Problem is almost same because that is the problem ;) – axiom Nov 10 '12 at 18:43
@user1795954 if you are also Maggi Iggam please ask a moderator to reconnect your accounts (you can flag this question to do so.) Otherwise editing the question to add more information will continue to be rejected. – Kate Gregory Nov 10 '12 at 18:44
@KateGregory : gud observation , but it is not so - i knew the question source was from codechef so i private messaged Maggi Iggam (he is in my contacts) to add that important propert :) – Maggi Iggam Nov 10 '12 at 18:58
up vote 4 down vote accepted

You can do it in O(N^2) as follows: create a hash set of your integers so that you could check a presence or absence of an element in O(1). After that, make two nested loops over all pairs of set elements {X, Y}. This is done in O(N^2).

For each pair {X, Y}, assume that X < Y, and calculate two numbers:

Z1 = X - (Y-X)
Z2 = Y + (Y-X)

A triple {X, Y, Zi} form an arithmetic sequence if Zi != X && Zi != Y && set.contains(Zi)

Check both triples {X, Y, Z1} and {X, Y, Z2}. You can do it in O(1) using a hash set, for a total running time of the algorithm of O(N^2).

share|improve this answer
thanks very much , but i think O(n) solution also exist , can you please use property i have just added now ? Maybe that can lead your superb brain to O(n) :) – Maggi Iggam Nov 10 '12 at 18:41
@user1795954 I don't think you can do it in O(N), but with the limits of 30K you can use an array of booleans (counters if your set is really a bag that allows duplicates) instead of a hash set to perform your checks much faster. – dasblinkenlight Nov 10 '12 at 19:02
Yepp i agree with you @dasblinkenlight – Maggi Iggam Nov 10 '12 at 19:17
@dasblinkenlight , what do you think now after reading answer below :P – Maggi Iggam Nov 11 '12 at 9:12
@MaggiIggam It may be workable, but it's almost certainly an overkill for a codechef-level problem. – dasblinkenlight Nov 11 '12 at 10:35

An alternative solution that is O(N+BlogB) (where B is the maximum size of the integers - in your case 30,000) is to consider the histogram H, where H[x] is the number of times x is present in the sequence.

This histogram can be computed in time N.

You are seeking elements a,b,c such that b-a=c-b. This is equivalent to 2b=a+c.

So the idea is to compute a second histogram G[x] for a+c and then loop through all elements b and add H[b]*G[2b] to the total. This takes time O(B).

(G[x] is the number of times in the sequence there are a pair of values a,b such that x=a+b.)

The only difficulty is computing G[x], but this can be done using the Fast Fourier Transform to convolve H[x] with itself in time O(BlogB).

share|improve this answer
It appears to be a very potential solution (vote up) , but i really cudnt understand completly , so can you supply code snippet ? – Maggi Iggam Nov 11 '12 at 9:10
There is a detailed explanation (including code samples) of how to do the convolution at – Peter de Rivaz Nov 11 '12 at 9:20
Hey , man that was excellent , bit it went much off my head :D – Maggi Iggam Nov 11 '12 at 11:29

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.