The Md-Approximation Property and Unitarisability
Abstract
We define a strengthening of the Haagerup-Kraus approximation property by means of the subalgebras of Herz-Schur multipliers Md(G) (d≥ 2) introduced by Pisier. We show that unitarisable groups satisfying this property for all d≥ 2 are amenable. Moreover, we show that groups acting properly on finite-dimensional CAT(0) cube complexes satisfy Md-AP for all d≥ 2. We also give examples of non-weakly amenable groups satisfying Md-AP for all d≥ 2.
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