Ascent sequences and 3-nonnesting set partitions

Abstract

A sequence x=x1 x2...xn is said to be an ascent sequence of length n if it satisfies x1=0 and 0≤ xi≤ asc(x1x2...xi-1)+1 for all 2≤ i≤ n, where asc(x1x2... xi-1) is the number of ascents in the sequence x1x2... xi-1. Recently, Duncan and Steingr\'msson proposed the conjecture that 210-avoiding ascent sequences of length n are equinumerous with 3-nonnesting set partitions of \1,2,..., n\. In this paper, we confirm this conjecture by showing that 210-avoiding ascent sequences of length n are in bijection with 3-nonnesting set partitions of \1,2,..., n\$ via an intermediate structure of growth diagrams for 01-fillings of Ferrers shapes.