# Finding the count of required entries within a list? [closed]

Design an algorithm that, given a list of n elements in an array, finds all the elements that appear more than n/3 times in the list. The algorithm should run in linear time ( n >=0 )

You are expected to use comparisons and achieve linear time. No hashing/excessive space/ and don't use standard linear time deterministic selection algorithm?? The problem is self-blocking I feel??

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## closed as not a real question by interjay, Nim, alain.janinm, KevJul 2 '12 at 14:00

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Hint: Take a look at Boyer and Moore's Linear Time Vote Algorithm

Steps:

1. Find median of array using median of medians algorithm in 0(n) time
2. partition using median as pivot element
3. use moore's voting algo in each part between
a) median and first element and
b) median and last element
4. check if median is the required element.

For more detailed algorithms to solve this problem you can refer to this document. Really, this would be very helpful.

Refer to this similar post also for more answers.

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really, how does that help? that allows detecting the majority element in the list and even then will only work if the list is organized in a specific way... (as far as I understand it) – Nim Jul 2 '12 at 9:21
@Nim - no special organization of the list is required. But I'm not sure that this is a helpful hint either. – Stephen C Jul 2 '12 at 9:28
Maybe by modifying this algorithm to increment by 2/decrement by 1? After a first iteration over the list, check whether the selected element has indeed more than 1/3 occurrences. If it is not the case then stop, otherwise output it and then run the unmodified algorithm while ignoring the first found element. In 4 iterations in total you should be fine, however the modified algorithm has to be proven… which would probably be difficult as part of an interview! – Didier L Jul 2 '12 at 9:36
Problem description says "don't use standard linear time deterministic selection algorithm", so that would rule out your first step of finding the median. It does seem like a silly restriction though. – interjay Jul 2 '12 at 10:12
Chivalryman's Tetris algorithm here is a much better way to solve this problem than the Voting algorithm. – Vicky Chijwani Nov 3 '12 at 23:14