Groups of $\mathrm{I}_G$-type (2505.13347v2)

Abstract: In this work, we address a question posed by Dehornoy et al. in the book "Foundations of Garside Theory" that asks for a theory of groups of $\mathrm{I}G$-type when $G$ is a Garside group. In this article, we introduce a broader notion than the one suggested by Dehornoy et al.: given a left-ordered group $G$, we define a group of $\mathrm{I}_G$-type as a left-ordered group whose partial order is isomorphic to those of $G$. Furthermore, we develop methods to give a characterization of groups of $\mathrm{I}{\Gamma}$-type in terms of skew braces when $\Gamma$ is an Artin-Tits group of spherical type and classify all groups of $\mathrm{I}{\Gamma}$-type where $\Gamma$ is an irreducible spherical Artin-Tits group, therefore providing an answer to another question of Dehornoy et al. concerning $\mathrm{I}{B_n}$ structures where $B_n$ is the braid group on $n$ strands with its canonical Garside structure.