On the isomorphism problem for even Artin groups
Abstract: An even Artin group is a group which has a presentation with relations of the form $(st)n=(ts)n$ with $n\ge 1$. With a group $G$ we associate a Lie $\mathbb Z$-algebra $\mathcal{TG}r(G)$. This is the usual Lie algebra defined from the lower central series, truncated at the third rank. For each even Artin group $G$ we determine a presentation for $\mathcal{TG}r(G)$. Then we prove a criterion to determine whether two Coxeter matrices are isomorphic. Let $c,d\in\mathbb N$ such that $c\ge1$, $d\ge2$ and $\gcd(c,d)=1$. We show that, if two even Artin groups $G$ and $G'$ having presentations with relations of the form $(st)n=(ts)n$ with $n\in{c}\cup{dk\mid k\ge1}$ are such that $\mathcal{TG}r(G)\simeq\mathcal{TG}r(G')$, then $G$ and $G'$ have the same presentation up to permutation of the generators. On the other hand, we show an example of two non-isomorphic even Artin groups $G$ and $G'$ such that $\mathcal{TG}r(G)\simeq\mathcal{TG}r(G')$.
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