Bootstrap percolation of extension hypergraphs

Abstract

For k-graphs F and H0 the F-bootstrap percolation process (or F-process) starting with H0 is a sequence (Hi)i≥0 of k-graphs such that Hi+1 is obtained from Hi by adding all those e∈ V(H0)(k) E(Hi) as edges that complete a new copy of F. The running time of this F-process, denoted by MF(H0), is the smallest i with Hi=Hi+1. Bollob\'as proposed the problem of determining the maximum running time for n∈N, i.e., MF(n)= V(H0)=nMF(H0)\,. Recently, Noel and Ranganathan initiated the study of this quantity for k-graphs. In this work, we determine the asymptotics of MF(n) for a large class of k-graphs. Given a graph G=(V,E), the k-extension of G is a k-graph F(k)(G) obtained from G by enlarging each edge with a (k-2)-set of new vertices. We show that for every graph G on t vertices and every k≥ 3, MF(k)(G)(n)≤ Ck,t for some constant Ck,t depending only on t and k.