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I'm in a strange place here. I've written an algorithm, and am now not certain how to document it. I'm looking for assistance in turning this logic into a precise description.


I have a method that takes a variable number of groups as input and spits out a large set of results. The number of results varies with the distribution of items in the groups and the number of groups. I can calculate the number of results that will be created as such:

In Psudocode:

(# of groups -1) * (# items in group 1) * (# items in group 2) * ... * (# items in group n)

In English:

The number of groups minus one, times the number of items in group 1, times the number of items in group 2, times the number of items in group 3 ... etc.


Both the pseudocode and English descriptions above seem unwieldy.

How do I more succinctly describe this algorithm? Is there a compact mathematical formula? Or can it be described with more precise words? Better Pseudocode? Any advice would be greatly appreciated.

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What is the intended use of this algorithm. Maybe the description could formulate better from a real-world example of how/when to use it. – Dan W Aug 14 '12 at 20:25
How about "The product of the orders of each group and one less than the number of groups"? – Wug Aug 14 '12 at 20:27
Do you mean "group" as the algebraic structure? – Jordan Aug 14 '12 at 20:31
Why does the documentation need to be incredibly concise? A simple sentence or two is adequate. And you've already written enough to describe it perfectly well. Sometimes a concise mathematical formula is less readable than a few extra words. – user85109 Aug 14 '12 at 22:26
@Jordan - "group" is meant in a generic sense here, as well as the usage of the term "set" – xelco52 Aug 15 '12 at 16:58
up vote 1 down vote accepted

Here's my go:

(n-1) * (product of cardinality across sets 1..n) where n = # of groups

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You could use the capital Pi notation to express this very neatly. Model the groups as sets and use the cardinality notation to mean # of items in group.

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It is like (N-1)*Mult(k(i))(i from 0 to N-1)


Go here: http://en.wikipedia.org/wiki/Direct_product_of_groups

And look for:

===Finite direct products===

enter image description here

Dont forget to multiply with N-1 ;)

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This is clearest to me, and probably most people with an OO background instead of an abstract math degree.

(# of groups - 1) * (group1.size) * (group2.size) * ... * (groupN.size)
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