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I ran across the question below in an old exam. My answers just feels a bit short and inadequate. Any extra ideas I can look into or reasons I have overlooked would be great. Thanx

Consider the MAD method compression function, mapping an object with hash code i to element [(3i + 7)mod9027]mod6000 of the 6000-element bucket array. Explain why this is a poor choice of compression function, and how it could be improved.

I basically just say that the function could be improved by changing the value for p (or 9027) to an prime number and choosing an other constant for a (or 3) could also help.

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Yes, I think the 3 and the 9027 need to be coprime. I don't think the +7 matters and can probably be eliminated. If you do make them coprime then the first part will spread elements uniformally across the 9027 but then fold this into 6000 so that the top 3027 will always overlap with the first 3027 of the 6000, i.e. there'll be twice as many elements generally distributed into the first 3027 buckets. If you can pick p closer to 6000, e.g. 6001, that might be better? Or maybe you can even use 6000 with a different a? But I don't remember the theory here. – Rup Jun 10 '10 at 18:10
up vote 3 down vote accepted

Rup's comment is essentially the correct answer. 3 and 9027 are both divisible by 3, so 3i + 7 maps onto only 1/3 of the range 0-9026. Then the mapping mod 6000 maps 2/3 of the values to the lower half. So bucket 1 will contain roughly 1/1500 of the values [if I've done the math right] rather than the 1/6000 you would want. Bucket 0 will be empty.

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Thanks, all the answers just gave me that little bit of extra info and insight that i sought :) – htdIO Jun 10 '10 at 19:14

if i is uniformly distributed over a large enough range, then (3i + 7)mod9027 will be evenly distributed over 0-9026, but then taking mod 6000 means two thirds of the hashes will be in the first half of the range (0 to 3026 and 6000 to 9026 inclusive), and one third in the second half (3037 to 5999 inclusive).

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