Congruence subgroups and crystallographic quotients of small Coxeter groups

Abstract

Small Coxeter groups are precisely the ones for which the Tits representation is integral, which makes the study of their congruence subgroups relevant. The symmetric group Sn has three natural extensions, namely, the braid group Bn, the twin group Tn and the triplet group Ln. The latter two groups are small Coxeter groups, and play the role of braid groups under the Alexander-Markov correspondence for appropriate knot theories, with their pure subgroups admitting suitable hyperplane arrangements as Eilenberg-MacLane spaces. In this paper, we prove that the congruence subgroup property fails for infinite small Coxeter groups which are not virtually abelian. As an application, we deduce that the congruence subgroup property fails for both Tn and Ln when n 4. We also determine subquotients of principal congruence subgroups of Tn, and identify the pure twin group PTn and the pure triplet group PLn with suitable principal congruence subgroups. Further, we investigate crystallographic quotients of these two families of small Coxeter groups, and prove that Tn /PTn', Tn/Tn'' and Ln /PLn' are crystallographic groups. We also determine crystallographic dimensions of these groups and identify the holonomy representation of Tn/Tn''.

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