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I have a directed graph which is strongly connected, but that removing any edge from it makes the graph no longer strongly connected.

How can I prove that such a graph has no more than 2n − 2 edges? (where n ≥ 3)

I've been searching literature for a couple of days but it seems such a proof never been made. Any hints are appreciated.

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Unless you do this for fun in your spare time, maybe you should add a homework tag. –  heneryville Nov 16 '11 at 23:08
why by induction? –  toon81 Nov 16 '11 at 23:09
@heneryville It's not a homework but one of the unanswered sample exam questions. I thought about it but couldn't come up with an answer nor a closer proof. –  Pooja Nov 16 '11 at 23:17
@toon81 I thought it's appropriate to proof by induction.. I am not sure, maybe also with contradiction. –  Pooja Nov 16 '11 at 23:18
hang on, it's an exam question, and yet you don't think it's ever been proven? is there a proof, or is it a possibility that there is no proof? in that case, you may need to prove either the contrary, or worse, that there isn't a proof. –  toon81 Nov 16 '11 at 23:22

2 Answers 2

Here's one outline (details omitted to avoid completely spoiling an exam question).

  1. Prove that the graph G has a simple cycle C.
  2. Prove that every arc in G whose tail and head belong to V(C) belongs to C.
  3. Prove that G/C (graph obtained from G by contracting every arc in C) is strongly connected and that, for all arcs e in G/C, the subgraph G/C - e is not strongly connected.
  4. Conclude by strong induction that G has at most 2|V(G)| - 2 arcs.
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+1 nice :) :) :) –  Antti Huima Nov 17 '11 at 6:03

This is untrue. Proof by counter-example. Graph has nodes A, B, and C

  • A -> B
  • B -> A
  • A -> C
  • B -> C
  • C -> B

This is strongly connected.

If I removed C->B, then C is isolated (you cannot get to anything from it) and is not strongly connected. Thus I have provided a graph that:

  1. Is strongly connected
  2. Has more than 2n-2 nodes
  3. If I remove one edge, it is no longer strongly connected
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this has 2n-2 nodes... –  Jean-Bernard Pellerin Nov 16 '11 at 23:25
there is no route C->A or C->B so it is not strongly connected. –  Karoly Horvath Nov 17 '11 at 0:03
@CaseyRobinson Yeah. you're right. Proof by counter example. I also listed one of the edges twice. How does it look now? –  heneryville Nov 17 '11 at 2:53
@Jean-BernardPellerin It has 3 nodes and 5 edges. 5>2*3-2. –  heneryville Nov 17 '11 at 2:54
Oops, but it still stands that you can't just remove ANY edge and make it not strongly-connected, you've just found 1 edge which when removed makes it not strongly connected. Try removing A->B. Still strongly connected. –  Jean-Bernard Pellerin Nov 17 '11 at 2:59

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