Random Graphs with Few Disjoint Cycles

Kurauskas, Valentas; McDiarmid, Colin

doi:10.1017/s0963548311000186

Cited by 7 publications

(16 citation statements)

References 11 publications

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“…Besides those discussed above, examples show that it can be constant (forbidding a star) and it can be linear (forbidding two disjoint triangles). The last statement follows from [10], where it is shown that the class Ex(C 3 ∪ C 3 ) is asymptotically the same as the class of graphs G having a vertex v such that G − v is a forest.…”

Section: Upper Boundsmentioning

confidence: 88%

Maximum degree in minor-closed classes of graphs

Giménez

Mitsche

Noy

2016

European Journal of Combinatorics

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Section: Upper Boundsmentioning

confidence: 88%

Maximum degree in minor-closed classes of graphs

Giménez

Mitsche

Noy

2016

European Journal of Combinatorics

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“…For two sequences of reals

(a_{n})

and

(b_{n})

which are positive for n sufficiently large, we write

a_{n} \sim b_{n}

\lim_{n \to \infty} \frac{a_{n}}{b_{n}} = 1

. The next result extends Theorem 1.2 of on forests. Theorem Let

scriptA

be a proper addable minor‐closed class of graphs, with growth constant γ ; and let k be a fixed positive integer.…”

Section: Introductionmentioning

confidence: 62%

“…The inclusion (1) is ‘nearly an equality’. To be more precise, it was shown in that as

n \to \infty

| {(Ex (k + 1) C)}_{n} | = (1 + e^{- Ω (n)}) | {({apex}^{k} ℱ)}_{n} | .

Thus

Ex (k + 1) C

consists of

{apex}^{k} ℱ

together with an exponentially smaller class of ‘exceptional’ graphs. A similar result holds for unlabelled graphs ; we consider only labelled graphs in this paper.…”

Section: Introductionmentioning

confidence: 99%

“…Recall that the number f ( k ) in the Erdős‐Pósa theorem must be of order

k \ln k

. From (3) and Theorem 1.1 it follows that by removing just k vertices we can obtain: a forest from almost every graph with at most k disjoint cycles ; more generally, a graph without any cycles of length at least

ℓ

from almost every graph with at most k disjoint cycles of length at least

ℓ

(see also ); a collection of cacti (that is, a graph with each edge in at most one cycle) from almost every graph with at most k disjoint subdivisions of the diamond graph

D = K_{4} - e

see Fig. below. In contrast, by Remark 5.7 below, almost none of the graphs in

Ex 2 K_{4}

can be turned into a series‐parallel graph by removing one vertex.…”

Section: Introductionmentioning

confidence: 99%

“…See for numerical values for these limiting probabilities in the case when

scriptA

is the class of forests. We shall actually prove a detailed extension of this result, Theorem 6.1 below, concerning the limiting distribution of the unlabelled ‘fragment’ graph formed from the vertices not in the ‘giant’ component.…”

Section: Introductionmentioning

confidence: 99%

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Random graphs containing few disjoint excluded minors

McDiarmid

Kurauskas

2012

Random Struct Algorithms

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The Erdős‐Pósa theorem (1965) states that in each graph G which contains at most k disjoint cycles, there is a ‘blocking’ set B of at most f(k) vertices such that the graph G – B is acyclic. Robertson and Seymour (1986) give an extension concerning any minor‐closed class scriptA of graphs, as long as scriptA does not contain all planar graphs: in each graph G which contains at most k disjoint excluded minors for scriptA, there is a set B of at most g(k) vertices such that G – B is in scriptA. In an earlier paper (Kurauskas and McDiarmid, Combin, Probab Comput 20 (2011) 763–775), we showed that, amongst all graphs on vertex set [n]={1,…,n} which contain at most k disjoint cycles, all but an exponentially small proportion contain a blocking set of just k vertices. In the present paper we build on the previous work, and give an extension concerning any minor‐closed graph class scriptA with 2‐connected excluded minors, as long as scriptA does not contain all fans (here a ‘fan’ is a graph consisting of a path together with a vertex joined to each vertex on the path). We show that amongst all graphs G on [n] which contain at most k disjoint excluded minors for scriptA, all but an exponentially small proportion contain a set B of k vertices such that G – B is in scriptA. (This is not the case when scriptA contains all fans.) For a random graph Rn sampled uniformly from the graphs on [n] with at most k disjoint excluded minors for scriptA, we consider also vertex degrees and the uniqueness of small blockers, the clique number and chromatic number, and the probability of being connected. © 2012 Wiley Periodicals, Inc. Random Struct. Alg., 44, 240‐268, 2014

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On graphs with few disjoint t-star minors

McDiarmid¹

2011

European Journal of Combinatorics

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Random Graphs with Few Disjoint Cycles

Cited by 7 publications

References 11 publications

Maximum degree in minor-closed classes of graphs

Maximum degree in minor-closed classes of graphs

Random graphs containing few disjoint excluded minors

On graphs with few disjoint t-star minors

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