# What is the maximum number of edges in a directed graph with n nodes?

What is the maximum number of edges in a directed graph with n nodes? Is there any upper bound?

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If you have `N` nodes, there are `N - 1` directed edges than can lead from it (going to every other node). Therefore, the maximum number of edges is `N * (N - 1)`.

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Correct. If edges are allowed to go from a node to itself, then the maximum is `N^2`. –  ypercube Feb 22 '11 at 23:56
@M.A you are correct if you are talking about an undirected graph. In a directed graph however edge (A,B) is not the same as edge (B,A) –  Bob9630 Feb 7 at 22:30
N*(N-1) is number of edges in directed graph. Number of edge in undirected graph is (N * (N-1)) / 2 –  Charles Chow May 23 at 16:56

If the graph is not a multi graph then it is clearly n * (n - 1), as each node can at most have edges to every other node. If this is a multigraph, then there is no max limit.

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The correct answer is n*(n-1)/2. Each edge has been counted twice, hence the division by 2. A complete graph has the maximum number of edges, which is given by n choose 2 = n*(n-1)/2.

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This is only true if you disallow directed cycles in the graph. –  István Zachar Feb 6 '12 at 11:14
This is only true for undirected graphs –  Bandicoot Jul 30 '12 at 0:44
N*(N-1)/2 is only true for undirected graphs as edge count for each node decrease gradually from (n-1),(n-2),(n-3),....,1 (all gets sum into n(n-1)/2. However, for directed graphs you should consider an outword edge from each and every vertex and hence n(n-1). –  Shinchan Jun 21 at 12:50

Can also be thought of as the number of ways of choosing pairs of nodes n choose 2 = n(n-1)/2. True if only any pair can have only one edge. Multiply by 2 otherwise

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There can be as many as `n(n-1)/2` edges in the graph if not multi-edge is allowed.

And this is achievable if we label the vertices `1,2,...,n` and there's an edge from `i` to `j` iff `i>j`.

See here.

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In an undirected graph (excluding multigraphs), the answer is n*(n-1)/2. In a directed graph an edge may occur in both directions between two nodes, then the answer is n*(n-1).

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Surely not. Is it not correcct that a directed graph can have loops therefore then the total number of nodes should be N^2.

We all agree right that N(N-1)/2 is number of edges in a complete graph. If it is directed then we double this mount taking away the 1/2 so now we have N(N-1). Then since it is directed we can have a loop back at the start vertex ie (a,a) so then we have to take off the -1 leaving us with N(N) AKA N^2

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Undirected is N^2. Simple - every node has N options of edges (himself included), total of N nodes thus N*N

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N^2 includes repetition of directions so you count more than the actual edges. {1,2} is the same as {2,1} in undirected. In an undirected graph its `n(n-1)/2`. –  Geo Papas Sep 4 at 17:00