Lower bounds in Lp-transference for crossed-products

Abstract

Let be a measure-preserving action and L L∞() the natural inclusion of the group von Neumann algebra into the crossed product. When μ() = ∞, we have that this natural embedding is not trace-preserving and therefore does not extends boundedly to the associated noncommutative Lp-spaces. Nevertheless, we show that when has an invariant mean there is an isometric embedding of Lp(L ) into an ultrapower of Lp( ) that intertwines Fourier multipliers and is L -bimodular. As a consequence we obtain the lower transference bound \[ \| Tm: Lp(L ) Lp(L ) \| ≤ \| (id Tm): Lp( ) Lp( ) \|, \] and the same follows for complete norms. The condition of having an invariant mean is quite restrictive. Therefore, we explore whether other equivariant embeddings : L L∞() yield a more general transference result. We show that the transference proof above works verbatim whenever is completely positive, amenable (in the sense of inducing an amenable correspondence) and intertwines Fourier multipliers at the L2-level. Although no new transference results are obtained, both the classification of equivariant maps and the study their amenability may be of independent interest to some readers.