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I'm attempting to create an algorithm that can sort an array of integers in O(N) time.

  • The number of digits in all of the intergers is N
  • Each element has an unknown number of digits
  • The algorithm should sort the array in O(N) time regardless of how the digits are distributed

I have a working solution for this problem, that runs in O(N) time, I'm just having trouble trying to prove that it does so.

Create a set of N buckets and add items to their corresponding bucket based off how
many digits are in the integer -O(N)

Radix sort each bucket, and then concatenate the buckets back together. 
Sum k=0 to N of O(k*n)
k = Number of digits
n = number of items with k digits

The solution that I have come up with is that the ∑k*∑n will always equal N.

Attempt at a proof

Base case: Array has 1 item.
T(N)= k*1. k=N = O(N)

I'm unsure how to do the inductive step (if it is even required).

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Your radix sort idea may be more expensive than you think. Eg. N=4, array = [1,23,456,7890] –  ElKamina Jan 31 '12 at 17:39
    
@ElKamina, in your example, with the ending 0 removed, n=9 –  Kent Jan 31 '12 at 17:46

1 Answer 1

The following screenshot explains it:

screenshot

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Thank you, this helped me figure it out. –  cocarin Jan 31 '12 at 21:09
1  
It is customary to link or credit sources when you use them. –  RBarryYoung Jul 26 '12 at 3:53

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