Coarse geometry of stable mixed commutator length I: duality and functional analysis on chains
Abstract
Let G be a group and N its normal subgroup. On the mixed commutator subgroup [G,N], the mixed stable commutator length sclG,N and the restriction of the ordinary stable commutator length sclG are defined. We characterize when they are bi-Lipschitz equivalent by the vanishing of a certain R-linear space W(G,N) related to invariant quasimorphisms. For the proof, we obtain a refined version of the generalized mixed Bavard duality theorem, and perform functional analysis on the completion of a certain space of 1-chains.
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