An lp-Version of von-Neumann Dimension For Banach Space Representations of Sofic Groups
Abstract
A. Gournay defined a notion of lp-dimension for subspaces of the lq-left-regular representation of an amenable discrete group. We give an alternative definition that works for sofic groups and a different notion for groups satisfying the Connes embedding conjecture, and for more general representations on Banach spaces. We extend certain results due to Gournay, as well as discuss lp-Betti numbers of Free groups.
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