The K(π,1) conjecture and acylindrical hyperbolicity for relatively extra-large Artin groups

Abstract

Let A be an Artin group with defining graph . We introduce the notion of A being extra-large relative to a family of arbitrary parabolic subgroups. This generalizes a related notion of A being extra-large relative to two parabolic subgroups, one of which is always large type. Under this new condition, we show that A satisfies the K(π,1) conjecture whenever each of the distinguished subgroups do. In addition, we show that A is acylindrically hyperbolic under only mild conditions.

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