4
votes
4answers
806 views

Algorithm to compute mode

I'm trying to devise an algorithm in the form of a function that accepts two parameters, an array and the size of the array. I want it to return the mode of the array and if there are multiple modes, ...
0
votes
1answer
528 views

C++ Looking for the Element with the highest occurence in an array

I'm looking for an elegant way of determining which element has the highest occurrence (mode) in a C++ ptr array. For example, in {"pear", "apple", "orange", "apple"} the "apple" element is the ...
0
votes
3answers
614 views

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?
0
votes
2answers
187 views

find mode in a rolling window of a long sequence of data with duplicates

Give a sequence of data (with duplicates), move a fix-sized window along the data sequence and find mode in the window at each iteraion, where the oldest data is removed and a new data is inserted to ...
1
vote
2answers
94 views

Algorithm: Finding the Mode with Imperfect Values

I want to find the mode of a dataset where the numbers are close, but not exact. For example let's say I have the following array: [0.00, 100.12, 101.00, 99.75, 97.5, 102.4, 36.34, 103.11, 100.20, ...
2
votes
2answers
270 views

Finding a mode with decreasing precision

I feel like there should be an available library to more simply do two things, A) Find the mode to an array, in the case of doubles and B) gracefully degrade the precision until you reach a particular ...
5
votes
3answers
5k views

Computing the mode (most frequent element) of a set in linear time?

In the book "The Algorithm Design Manual" by Skiena, computing the mode (most frequent element) of a set, is said to have a Ω(n log n) lower bound (this puzzles me), but also (correctly i guess) that ...
2
votes
5answers
939 views

Computing the statistical mode

I'm currently trying to verify whether or not, given an unsorted array A of length N and an integer k, whether there exists some element that occurs n/k times or more. My thinking for this problem ...