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I feel like I'm way overthinking this problem, but here goes anyway...

I have a hash table with M slots in its internal array. I need to insert N elements into the hash table. Assuming that I have a hash function that randomly inserts am element into a slot with equal probability for each slot, what's the expected value of the total number of hash collisions?

(Sorry that this is more of a math question than a programming question).

Edit: Here's some code I have to simulate it using Python. I'm getting numerical answers, but having trouble generalizing it to a formula and explaining it.

import random
import pdb

N = 5
M = 8

NUM_ITER = 100000

def get_collisions(table):
    col = 0
    for item in table:
        if item > 1:
            col += (item-1)
    return col

def run():
    table = [0 for x in range(M)]

    for i in range(N):
        table[int(random.random() * M)] += 1

    #print table
    return get_collisions(table)

# Main

total = 0
for i in range(NUM_ITER):
    total += run()

print float(total)/NUM_ITER
share|improve this question
how do you want "triplet" collisions measured ? –  wildplasser Feb 1 '12 at 22:47
Whatever makes the most sense I guess. So I'll go with counting it as two collisions (one per new element added after the first) –  numegil Feb 1 '12 at 22:48
The best measure appears to be the amount of work to retrieve all items, which is SUM(x * (x+1) /2) with X is the number of items in a bucket, and the sum is over all buckets. –  wildplasser Feb 1 '12 at 22:55

2 Answers 2

up vote 17 down vote accepted

You'll find the answer here: The expected number of collisions for m buckets and n inserts is

n - m * (1 - ((m-1)/m)^n).

share|improve this answer
+1 for referencing a source. –  lumberjack4 Oct 11 '12 at 22:23
There is also a proof of this on the Math StackExchange. –  ShreevatsaR Dec 6 '13 at 9:14
Answer should include the proof. –  MVTC Oct 21 '14 at 3:23
Is there a table available for generic m values (such as 2^32) ? –  Cyan Apr 23 at 9:41

The formula for the SUM(x*(x+1)/2) metric can be found here, and the expected value appears to be (n/2m)* (n+2m -1).

Don't know about the variance, IANAM.

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