Slow graph bootstrap percolation I: Cycles

Abstract

Given a fixed graph H and an n-vertex graph G, the H-bootstrap percolation process on G is defined to be the sequence of graphs Gi, i≥ 0 which starts with G0 := G and in which Gi+1 is obtained from Gi by adding every edge that completes a copy of H. We are interested in MH(n) which is the maximum number of steps, over all n-vertex graphs G, that this process takes to stabilise. We determine this maximum running time precisely when H is a cycle, giving the first infinite family of graphs H for which an exact solution is known. We find that MCk(n) is of order k-1(n) for all 3≤ k∈ N. Interestingly though, the function exhibits different behaviour depending on the parity of k and the exact location of the values of n for which MH(n) increases is determined by the Frobenius number of a certain numerical semigroup depending on k.