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In a directed acyclic graph with n vertices, what is the maximum possible number of directed edges in it?

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This question is off topic for Stack Overflow. You might try which welcomes math questions at all levels. – Greg Hewgill Jul 28 '12 at 7:19
Not to mention, this sounds like a homework problem. And I took the bait :-/ – Richard Sitze Jul 28 '12 at 7:21
Also, it's a duplicate of How can I prove the maximum number of edges? – Greg Hewgill Jul 28 '12 at 7:25
up vote 7 down vote accepted

Assume N vertices/nodes, and let's explore building up a DAG with maximum edges. Consider any given node, say N1. The maximum # of nodes it can point to, or edges, at this early stage is N-1. Let's choose a second node N2: it can point to all nodes except itself and N1 - that's N-2 additional edges. Continue for remaining nodes, each can point to one less edge than the node before. The last node can point to 0 other nodes.

Sum of all edges: (N-1) + (N-2) + .. + 1 + 0 == (N-1)(N)/2

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Thanks very much for your answer. – user1559262 Jul 28 '12 at 7:32
Hmm, this seems to argue with the answer. – Realz Slaw Sep 13 '12 at 3:06
@RealzSlaw The distinction is that a DAG is "acyclic"; the post you refer to discusses directed graphs in general. – Richard Sitze Sep 14 '12 at 4:24
@RichardSitze indeed, my bad. – Realz Slaw Sep 14 '12 at 10:18

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