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Could somebody kindly provide information on different categories of connectivity, such as 'weakly connected graph', 'strongly connected graph' etc..?

As I understand it, these two terms refer to directed graphs; I've added the definitions I know.JLeander 23:47, 2 February 2006 (UTC)[reply]

Figures

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It would be nice to have some figures in here, wouldn't it? Maybe I will cook some up at some point using xfig.JLeander 23:47, 2 February 2006 (UTC)[reply]

Fulkerson's theorem

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An earlier version of the page had a reference to "Fulkerson's theorem." My MathSciNet search didn't turn up any appropriate result known by this name. My guess is that the previous editor had max-flow/min-cut in mind---or am I missing something?JLeander 23:47, 2 February 2006 (UTC)[reply]

Question about digraphs

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What's the name for a digraph such that for each pair of vertices , there is either a path from to or a path from to ? I'd call it just connected, since this is an intermediate property between weak and strong connectivity, and is in fact equivalent to the existence of a path containing all vertices. However, I'm not an expert of the subject, and I was unable to find any reference about this, so far. fudo (questions?) 17:35, 27 April 2007 (UTC)[reply]

Maximal

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complete graphs

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"A complete graph with n vertices has no cuts at all, but by convention its connectivity is n-1." Agreed, except that everyone considers K1 to be connected. I think that means its connectivity is 1, not 0. Agreed? McKay (talk) 07:43, 8 March 2009 (UTC)[reply]

Menger's theorem

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The article's statement of Menger's theorem (the final paragraph of the Menger's theorem section) appears to me to be trivially false, and different from the statement given at Menger's theorem. Maproom (talk) 16:32, 5 November 2010 (UTC)[reply]

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The following discussion is closed. Please do not modify it. Subsequent comments should be made in a new section. A summary of the conclusions reached follows.
To not merge, given opposition and no support; no consensus for any other particular action. Klbrain (talk) 11:35, 13 February 2021 (UTC)[reply]

The new article Meshulam game concerns a theorem about the connectivity of a graph, in particular, a bound relating the connectivity to the outcome of a certain game on the graph. I am skeptical that the game is sufficiently notable to merit a full article. However, it is short and could fit nicely as a section in this article. What do others think? JBL (talk) 20:32, 31 July 2020 (UTC)[reply]

As far as I understand from the references, this game is about the standard notion of graph connectivity - it is about the homological connectivity of a graph. It may be better to merge it to that page. I am still working on these issues. --Erel Segal (talk) 20:04, 1 August 2020 (UTC)[reply]
Better not. The "game" is a separate well defined (sub)subject. My very best wishes (talk) 18:41, 12 December 2020 (UTC)[reply]
The discussion above is closed. Please do not modify it. Subsequent comments should be made on the appropriate discussion page. No further edits should be made to this discussion.