Upper bounds on the running time of bootstrap percolation

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). Although this problem has received a lot of attention recently, until now the best known upper bound for MKt(n), with t≥5, was the trivial bound n2. Here we provide the first non-trivial upper bound for this problem by showing that MKt(n)≤(t-3t-2+o(1))n2 holds for every integer t≥ 3. In fact, we prove the following more general result. For every k≥2, every k-graph F, and every e∈ E(F) we have MF(n)≤(π(F-e)+o(1))nk, where π is the Tur\'an density.