Garside shadows and biautomatic structures in Coxeter groups

Abstract

In 2022, Osajda and Przytycki showed that any Coxeter group W is biautomatic. Key to their proof is the notion of voracious projection of an element g ∈ W, which is used iteratively to construct a biautomatic structure for W: the voracious language. In this article, we generalize these two notions by defining them for any Garside shadow B in a Coxeter system (W,S). This leads to the result that any finite Garside shadow in (W,S) can be used to construct a biautomatic structure for W. In addition, we show that for the Garside shadow L of low elements, the biautomatic structure obtained corresponds to the original voracious language of Osajda and Przytycki. These results answer a question of Hohlweg and Parkinson.