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As the question states. I seem to be unable to figure out the formula that corresponds to the paper & pencil results. I am looking for a formula to give me the maximum possible number of triangles in an UNDIRECTED graph.

A triangles is defined as any connection of nodes of path length 3 that forms a cycle. e.g If I have a graph with 1<->2<->3<->1 is a triangle(<-> is an undirected connection). If what a triangle is is unclear the top of page 2 has a figure showing what a triangle is in this context http://arxiv.org/pdf/1202.5230v1.pdf.


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Complete graph has all possible combinations of 3 nodes as a triangle. Do you have other requirements on a graph? E.g. planarity? –  Ante Oct 5 '12 at 21:17
No other requirements. @Vesper is correct. Thanks to you both! –  quine Oct 6 '12 at 18:43

1 Answer 1

up vote 4 down vote accepted

C(3,n) should do. Basically, you need a number of combinations of 3 out of your entire set of graph nodes.

EDIT: Since the link is now down as omegamath wants to be monetized, I have to explain further. C(m,n) is a number of possible combinations of M elements out of N different ones, and is equal to (N!)/(M!*(N-M)!) where ! is a factorial operation, that is N! = 1*2*3*...*N.

C(3,n) = (N*(N-1)*(N-2))/(1*2*3)

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The link you posted is down. Is there any chance you could please detail further your answer? Thanks in advance –  Matteo Jan 13 at 23:46
@Matteo Okay, here's some info, you might try searching for combinations and permutations numbers yourself for further detalization. –  Vesper Jan 14 at 5:15

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