A countable family of finitely presented infinite congruence-free monoids
Abstract
We prove that monoids Mon a,b,c,d : anb=0, ac=1, db=1, dc=1, dab=1, da2b=1, …, dan-1b=1 are congruence-free for all n≥ 1. This provides a new countable family of finitely presented congruence-free monoids, bringing one step closer to understanding the Boone--Higman Conjecture. We also provide examples which show that finitely presented congruence-free monoids may have quadratic Dehn function.
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