Asymptotically optimal lower bounds on weak saturation numbers for hypergraphs

Abstract

Given an r-uniform hypergraph H and a positive integer n, the weak saturation number wsat(n,H) is the minimum number of edges in an r-uniform hypergraph F on n vertices such that the missing edges in F can be added, one at a time, so that each added edge creates a copy of H. For the case of graphs (r = 2), asymptotically optimal general lower bounds for these numbers in terms of the minimum vertex degree of H are known. In this work, we generalize these bounds to the case of hypergraphs and establish their asymptotic optimality. To prove this, we introduce a lower bound method based on polymatroids. This method generalizes a linear algebraic method but, unlike the original version, makes it possible to derive lower bounds with non-integer asymptotic coefficients.