Homological connectivity of random <i>k</i>‐dimensional complexes

Meshulam, Roy; Wallach, Nolan R.

doi:10.1002/rsa.20238

Cited by 170 publications

(279 citation statements)

References 5 publications

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“…If H 1 (X, Z/pZ) = 0 for every p, then H 1 (X, Z) = 0 as well [7]. By the Linial-Meshulam-Wallach results ( [10,11]), H 1 (Y, Z) is finite and has no p-torsion for any fixed p. So once p 2 log n/n, either H 1 (Y, Z) is trivial, or it is a finite generated abelian group with torsion approaching infinity. The first scenario might seem more plausible, but as far as we know, nothing is proved either way.…”

Section: Open Problemsmentioning

confidence: 99%

The fundamental group of random 2-complexes

Babson

Hoffman

Kahle

2010

J. Amer. Math. Soc.

160

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We study Linial-Meshulam random 2 2 -complexes Y ( n , p ) Y(n,p) , which are 2 2 -dimensional analogues of Erdős-Rényi random graphs. We find the threshold for simple connectivity to be p = n − 1 / 2 p = n^{-1/2} . This is in contrast to the threshold for vanishing of the first homology group, which was shown earlier by Linial and Meshulam to be p = 2 log ⁡ n / n p = 2 \log n / n . We use a variant of Gromov’s local-to-global theorem for linear isoperimetric inequalities to show that when p = O ( n − 1 / 2 − ϵ p = O( n^{-1/2 -\epsilon } ), the fundamental group is word hyperbolic. Along the way we classify the homotopy types of sparse 2 2 -dimensional simplicial complexes and establish isoperimetric inequalities for such complexes. These intermediate results do not involve randomness and may be of independent interest.

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Section: Open Problemsmentioning

confidence: 99%

The fundamental group of random 2-complexes

Babson

Hoffman

Kahle

2010

J. Amer. Math. Soc.

160

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“…More recently, the two-dimensional analog Y n,p,2 of the Erdős-Rényi model was considered by Linial-Meshulam in [11], and, further, the d-dimensional model Y n,p,d , for d ≥ 3, was considered by Meshulam-Wallach in [13].…”

Section: Theorem 11 (Erdős-rényi Theorem [4]) Assume That W(n) Is mentioning

confidence: 99%

“…Theorem 1.1 (Erdős-Rényi Theorem, [4]). Assume that w(n) is any function w : N → R, such that lim n→∞ w(n) = ∞, and p = p(n) is the probability depending on n. Then we have More recently, the two-dimensional analog Y n,p,2 of the Erdős-Rényi model was considered by Linial-Meshulam in [11], and, further, the d-dimensional model Y n,p,d , for d ≥ 3, was considered by Meshulam-Wallach in [13].…”

Section: Thresholds For Vanishing Of the (D − 1)st Homology Group Of mentioning

confidence: 99%

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The threshold function for vanishing of the top homology group of random 𝑑-complexes

Kozlov

2010

Proc. Amer. Math. Soc.

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Abstract. For positive integers n and d, and the probability function 0 ≤ p(n) ≤ 1, we let Y n,p,d denote the probability space of all at most d-dimensional simplicial complexes on n vertices, which contain the full (d − 1)-dimensional skeleton, and whose d-simplices appear with probability p(n). In this paper we determine the threshold function for vanishing of the top homology group in Y n,p,d , for all d ≥ 1. Thresholds for vanishing of the (d − 1)st homology group of random d-complexesIn 1959 Erdős and Rényi defined a natural model for random graphs which has since become classical. In this model, which we call 1 Y n,p,1 , the random graph has n vertices, and the edges are chosen uniformly and independently at random with probability p. Usually, one is interested in questions concerning various statistics on this probability space, in the situation when n goes to infinity, and p is a function of n. One of the main results of Erdős-Rényi concerning Y n,p,1 was the discovery of the threshold function for the connectivity of the graph. More precisely, reformulated in our language, they have shown the following theorem. Theorem 1.1 (Erdős-Rényi Theorem, [4]). Assume that w(n) is any functionw : N → R, such that lim n→∞ w(n) = ∞, and p = p(n) is the probability depending on n. Then we haveMore recently, the two-dimensional analog Y n,p,2 of the Erdős-Rényi model was considered by Linial-Meshulam in [11], and, further, the d-dimensional model Y n,p,d , for d ≥ 3, was considered by Meshulam-Wallach in [13].

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“…One may mention random surfaces [18], random 3-dimensional manifolds [9], random configuration spaces of linkages [11]. Linial, Meshulam and Wallach [15], [17] studied an important analogue of the classical Erdős-Rényi [10] model of random graphs in the situation of high-dimensional simplicial complexes. The random simplicial complexes of [15], [17] are d-dimensional, have the complete (d − 1)-skeleton and their randomness shows only in the top dimension.…”

Section: Introductionmentioning

confidence: 99%

Large random simplicial complexes, I

Costa

Farber

2016

J. Topol. Anal.

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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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Homological connectivity of random k‐dimensional complexes

Cited by 170 publications

References 5 publications

The fundamental group of random 2-complexes

The fundamental group of random 2-complexes

The threshold function for vanishing of the top homology group of random 𝑑-complexes

Large random simplicial complexes, I

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