On the Dehn functions of a class of monadic one-relation monoids

Abstract

We give an infinite family of monoids N (for N=2, 3, …), each with a single defining relation of the form bUa = a, such that the Dehn function of N is at least exponential. More precisely, we prove that the Dehn function ∂N(n) of N satisfies ∂N(n) Nn/4. This answers negatively a question posed by Cain & Maltcev in 2013 on whether every monoid defined by a single relation of the form bUa=a has quadratic Dehn function. Finally, by using the decidability of the rational subset membership problem in the metabelian Baumslag--Solitar groups BS(1,n) for all n ≥ 2, proved recently by Cadilhac, Chistikov & Zetzsche, we show that each N has decidable word problem.