Binomial Random Matroids
Abstract
Let B= Bk,n,p be a random collection of k-subsets of [n] where each possible set is present independently with probability p. Let E B be the event that B defines the set of bases of a matroid. We prove that If p= 1-cn(k(n-k) nk)1/2 where 0≤ cn≤ ∞, then \[ n∞[ E B | B|≥2]=cases1&cn0.\-c2/2&cn c.\\0&cn ∞.cases\] In addition, we identify a condition preventing the occurence of E B and prove a hitting time version for the occurence of B. We also prove that when E B occurs, B defines a sparse paving matroid w.h.p. In addition, study a greedy algorithm that produces a random matroid defined by a collection of hyperplanes. We use this to improve the estimates in HPV on m(n,k), p(n,k), s(n,k) where m(n, k), p(n, k), s(n, k) denote the number of matroids, paving matroids, and sparse paving matroids (respectively) of rank k on [n]. Our improvement lies in that we can deal with k growing slowly with n as opposed to k=O(1) in HPV. More generally, we obtain estimates for the number of matchings in nearly-regular hypergraphs with small codegree, which may be of independent interest.
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