2017
DOI: 10.1016/j.endm.2017.06.061
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The evolution of random graphs on surfaces

Abstract: Abstract. For integers g, m ≥ 0 and n > 0, let Sg(n, m) denote the graph taken uniformly at random from the set of all graphs on {1, 2, . . . , n} with exactly m = m(n) edges and with genus at most g. We use counting arguments to investigate the components, subgraphs, maximum degree, and largest face size of Sg(n, m), finding that there is often different asymptotic behaviour depending on the ratio m n . In our main results, we show that the probability that Sg(n, m) contains any given non-planar component con… Show more

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Cited by 10 publications
(20 citation statements)
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“…Using Lemma 2.11(g) we obtain ν (n, 2m) = ν (n) + o (1). Together with (11) this shows the statement.…”
Section: Erd őS-rényi Random Graph and Graphs Without Complex Componentssupporting
confidence: 54%
“…Using Lemma 2.11(g) we obtain ν (n, 2m) = ν (n) + o (1). Together with (11) this shows the statement.…”
Section: Erd őS-rényi Random Graph and Graphs Without Complex Componentssupporting
confidence: 54%
“…Using (7) and the fact that s = o(n) we get n U = (1 + o(1))n. Combining that with (10) yields that for n large enough…”
Section: Proof Of Theoremmentioning
confidence: 99%
“…Random graphs are arguably the most studied objects at the interface of combinatorics and probability theory. One aspect of their study consists in analyzing a uniform random graph of large size n in a prescribed family, for example, perfect graphs [31], planar graphs [32], graphs embeddable in a surface of given genus [19], graphs in subcritical classes [35], hereditary classes [23], or addable classes [13,30]. The present paper focuses on uniform random cographs (both in the labeled and unlabeled settings).…”
Section: Introductionmentioning
confidence: 99%