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I want to talk about places in a directed acyclic graph where there is more than one path from node node to another. It's not a "cycle", what should I call it? I'm using the term "diamond", but that implies just four nodes, which is not right.

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Is there even a term for this? –  nhahtdh Jun 1 '12 at 2:46
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I'd just describe it as multiple edges from A to B. –  bdares Jun 1 '12 at 2:47
    
Am I dense? Why isn't it just a "cycle"? Or do mean an entire graph that is a single list whose end.next points at head? Like an ouroboros? –  bluevector Jun 1 '12 at 2:53
    
@jonnyGold: a cycle is a directed path that loops back to one of its nodes, this question sounds like it is talking about two distinct directed paths from one node to another. –  mu is too short Jun 1 '12 at 2:55
    
@muistooshort: Ah. The word "diamond" grounded me in the circular buffer idea. We're talking about two arcs coming into a particular node irrespective of cycle-ness. How about calling it "multi-touch"? Seem hip these days. –  bluevector Jun 1 '12 at 3:00

1 Answer 1

As you stated, the correct term is unlikely to be diamond graph, which already has a similar but slightly different meaning.

It's ugly, but the graph you're referring to is a homeomorphism of the dipole graph. That is, you can simplify the graph by contracting any edge with in- and out-degree 1.

From past experience, graph theoretic terminology can be tough. If you've got friends or colleagues who are mathematicians, they should always be your first port of call in such cases. If you've got time up your sleeve, you can use a good reference on graph theory. I recommend either Graph Theory by Bondy and Murty or Graph Theory by Diestel. If neither are available, you could always try wikipedia, or one of the math related stackexchange sites.

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So I suppose I am talking about dipole-free graphs, or graphs with no subgraph homeomorphic to a dipole. Way too much trouble :), but thanks for the info. –  PaulMurrayCbr Jun 20 '12 at 3:42

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