Fundamental groups of clique complexes of random graphs

In this paper we introduce and develop the multi-parameter model of random simplicial complexes with randomness present in all dimensions. Various geometric and topological properties of such random simplicial complexes are characterised by convex domains in the high-dimensional parameter space (rather than by intervals, as in the usual one-parameter models). We find conditions under which a multi-parameter random simplicial complex is connected and simply connected. Besides, we give an intrinsic characterisation of the multi-parameter probability measure. We analyse links of simplexes and intersections of multi-parameter random simplicial complexes and show that they are also multi-parameter random simplicial complexes.

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“…Here we used the equation (6). Next we may combine the obtained equality with the inductive hypothesis…”

Section: The Modelmentioning

confidence: 99%

“…A different model of random simplicial complexes was studied by M. Kahle [13] and by some other authors, see for example [6]. These are the clique complexes of random Erdős-Rényi graphs, i.e.…”

Section: Introductionmentioning

confidence: 99%

Large random simplicial complexes, I

Costa

Farber

2016

J. Topol. Anal.

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“…This is equivalent to Definition 9 under an additional assumption that α 2 = 0. Complexes with µ 1 (S) > 1/3 were studies in §5 of [11].…”

Section: Uniform Hyperbolicitymentioning

confidence: 99%

“…The multi-parameter model which we discuss here allows regimes controlled by a combination of probability parameters associated to various dimensions. This model includes the well-known Linial -Meshulam -Wallach model [22], [23] as an important special case; as another important special case it includes the random simplicial complexes arising as clique complexes of random Erdős-Rényi graphs, see [20], [11].…”

Section: Introductionmentioning

confidence: 99%

Large random simplicial complexes, II; the fundamental group

Costa

Farber

2016

J. Topol. Anal.

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We study random simplicial complexes in the multi-parameter model focusing mainly on the properties of the fundamental groups. We describe thresholds for nontrivially and hyperbolicity (in the sense of Gromov) for these groups. Besides, we find domains in the multi-parameter space where these groups have 2-torsion. We also prove that these groups never have odd-prime torsion and their geometric and cohomological dimensions are either 0, 1, 2 or ∞. Another result presented in this paper states that aspherical 2-dimensional subcomplexes of random complexes satisfy the Whitehead Conjecture, i.e. all their subcomplexes are also aspherical, with probability tending to one.

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“…Equivalently, a non-empty set U ⊆ [n] forms a simplex in X p (n) if and only if U is a clique in the binomial random graph. Topological properties of X p (n) have been studied in [16,25,26]. Another example is the random neighbourhood complex arising from the binomial random graph by letting each non-empty set of vertices that have a common neighbour form a simplex [24].…”

Section: Proof Of Corollary 112mentioning

confidence: 99%

Vanishing of cohomology groups of random simplicial complexes

Cooley

Giudice

Kang

et al. 2019

Random Struct Algorithms

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We consider k-dimensional random simplicial complexes that are generated from the binomial random (k + 1)-uniform hypergraph by taking the downward-closure, where k ≥ 2. For each 1 ≤ j ≤ k − 1, we determine when all cohomology groups with coefficients in F 2 from dimension one up to j vanish and the zero-th cohomology group is isomorphic to F 2 . This property is not deterministically monotone for this model of random complexes, but nevertheless we show that it has a single sharp threshold. Moreover we prove a hitting time result, relating the vanishing of these cohomology groups to the disappearance of the last minimal obstruction. We also study the asymptotic distribution of the dimension of the j-th cohomology group inside the critical window. As a corollary, we deduce a hitting time result for a different model of random simplicial complexes introduced in [Linial and Meshulam, Combinatorica, 2006], a result which was previously only known for dimension two [Kahle and Pittel, Random Structures Algorithms, 2016].

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Fundamental groups of clique complexes of random graphs

Cited by 28 publications

References 25 publications

Large random simplicial complexes, I

Large random simplicial complexes, I

Large random simplicial complexes, II; the fundamental group

Vanishing of cohomology groups of random simplicial complexes

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