Classical and consecutive pattern avoidance in rooted forests

Abstract

Following Anders and Archer, we say that an unordered rooted labeled forest avoids the pattern σ∈Sk if in each tree, each sequence of labels along the shortest path from the root to a vertex does not contain a subsequence with the same relative order as σ. For each permutation σ∈Sk-2, we construct a bijection between n-vertex forests avoiding (σ)(k-1)k:=σ(1)·sσ(k-2)(k-1)k and n-vertex forests avoiding (σ)k(k-1):=σ(1)·sσ(k-2)k(k-1), giving a common generalization of results of West on permutations and Anders--Archer on forests. We further define a new object, the forest-Young diagram, which we use to extend the notion of shape-Wilf equivalence to forests. In particular, this allows us to generalize the above result to a bijection between forests avoiding \(σ1)k(k-1), (σ2)k(k-1), …, (σ)k(k-1)\ and forests avoiding \(σ1)(k-1)k, (σ2)(k-1)k, …, (σ)(k-1)k\ for σ1, …, σ ∈ Sk-2. Furthermore, we give recurrences enumerating the forests avoiding \123·s k\, \213\, and other sets of patterns. Finally, we extend the Goulden--Jackson cluster method to study consecutive pattern avoidance in rooted trees as defined by Anders and Archer. Using the generalized cluster method, we prove that if two length-k patterns are strong-c-forest-Wilf equivalent, then up to complementation, the two patterns must start with the same number. We also prove the surprising result that the patterns 1324 and 1423 are strong-c-forest-Wilf equivalent, even though they are not c-Wilf equivalent with respect to permutations.