On naturally labelled posets and permutations avoiding 12-34

Abstract

A partial order on [n] is naturally labelled (NL) if x y implies x<y. We establish a bijection between 3, 2+2-free NL posets and 12-34-avoiding permutations, determine functional equations satisfied by their generating function, and use series analysis to investigate their asymptotic growth, presenting evidence of stretched exponential behaviour. We also exhibit bijections between 3-free NL posets and various other objects, and determine their generating function. The connection between our results and a hierarchy of combinatorial objects related to interval orders is described.

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