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I'm trying to write a ruby function to determine the average expected search time for a skip list. I don't have a strong math background and I believe the results I'm getting from this function are not correct.

n = number of elements in the list

base = denominator of the promotion probability. i.e. if 1 of 4 nodes are promoted base = 4

def lookup_eficiency(n, base)
  return (Math.log(n, base)*(base/2.0))
end

How do I express an equation in Ruby which will take the number of elements in a skip-list and a base and return the average search time?

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So what? What is your question? –  sawa May 4 '13 at 20:22
    
Sorry, I thought it was implied but I just edited the question to make it explicit. –  dan_paul May 4 '13 at 20:26
    
If you want to measure the speed of the function, you can use the module Benchmark ruby-doc.org/stdlib-1.9.3/libdoc/benchmark/rdoc/Benchmark.html . Does that answer part of your question? –  Rots May 4 '13 at 20:33
    
Not exactly. I want to use this function to calculate the expected number of operations for a theoretical skip-list. I'm writing the skip-list itself in C. I want to be able to determine the theoretical search time for skip-lists with a varying number of nodes and varying probabilities of node promotion (i.e. 1/2 nodes promoted vs. 1/4, 1/8, etc.). –  dan_paul May 4 '13 at 20:39
    
But I don't know of many people who search for theoretical data! Better to get a profile-representative set of terms that you expect to actually turn up and run some nearly-real tests against that. (This matters because there are quite often functions that do better than expected when working with real data, or even worse than expected.) –  Donal Fellows May 4 '13 at 21:55

1 Answer 1

Since complexity of a skip list look up is O(logbase(n/base)), how about this ?

def lookup_efficiency(n, base)
  Math.log(n/base)/Math.log(base)
end

Make sure your base is a float so you don't end up with integer division !

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Why not just call base.to_f? It'll be a no-op if you already have a float. –  Dave S. May 4 '13 at 23:39
    
You're actually right. I just thought not to clutter the code with more than the basic functionality the OP required and mention it instead. –  SudoGuru May 4 '13 at 23:41
    
Thank you but I when I test your function, I get results that seem wrong. For instance, for a skip-list with 1000 elements and a promotion probability of 1/10 (n = 1000 and base = 10), the function returns 2.0. If base = 20 the function returns 1.306.... I believe this is incorrect since in any list where n > base, a search operation would, on average, require visiting approximately base/2 nodes on the "bottom list" alone. –  dan_paul May 5 '13 at 12:08
    
My bad, seems like I mistook the search look up time with the space needed to store the list. According to this the worse case is O(n) and the best case is O(log n). It's a pretty wide range and you can't be sure which calculation is the more accurate ( Although I suspect it to tend toward O(log n) the more levels you add .. ). I suggest calculating best and worst case and making your decision upon both. –  SudoGuru May 6 '13 at 6:47

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