Small Cancellation for Random Branched Covers of Groups
Abstract
We construct a random model for an n-fold branched cover of a finite acceptable 2-complex X. This includes presentation 2-complexes for finitely presented groups satisfying some mild conditions. For any λ >0, we show that as n goes to infinity, a random branched cover asymptotically almost surely is homotopy equivalent to a 2-complex satisfying geometric small cancellation C'(λ). As a consequence the fundamental group of a random branched cover is asymptotically almost surely Gromov hyperbolic and has small cohomological dimension.
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