Shape-Wilf-equivalences for vincular patterns

Abstract

We extend the notion of shape-Wilf-equivalence to vincular patterns (also known as "generalized patterns" or "dashed patterns"). First we introduce a stronger equivalence on patterns which we call filling-shape-Wilf-equivalence. When vincular patterns α and β are filling-shape-Wilf-equivalent, we prove that the direct sum ασ is filling-shape-Wilf-equivalent to βσ. We also discover two new pairs of patterns which are filling-shape-Wilf-equivalent: when α, β, and σ are nonempty consecutive patterns which are Wilf-equivalent, ασ is filling-shape-Wilf-equivalent to βσ; and for any consecutive pattern α, 1α is filling-shape-Wilf-equivalent to 1α. These equivalences generalize Wilf-equivalences found by Elizalde and Kitaev. These new equivalences imply many new Wilf-equivalences for vincular patterns