Multilinear transference of Fourier and Schur multipliers acting on non-commutative Lp-spaces

Abstract

Let G be a locally compact unimodular group, and let φ be some function of n variables on G. To such a φ, one can associate a multilinear Fourier multiplier, which acts on some n-fold product of the non-commutative Lp-spaces of the group von Neumann algebra. One may also define an associated Schur multiplier, which acts on an n-fold product of Schatten classes Sp(L2(G)). We generalize well-known transference results from the linear case to the multilinear case. In particular, we show that the so-called `multiplicatively bounded (p1,…,pn)-norm' of a multilinear Schur multiplier is bounded above by the corresponding multiplicatively bounded norm of the Fourier multiplier, with equality whenever the group is amenable. Further, we prove that the bilinear Hilbert transform is not bounded as a vector valued map Lp1(R, Sp1) × Lp2(R, Sp2) → L1(R, S1), whenever p1 and p2 are such that 1p1 + 1p2 = 1. A similar result holds for certain Calder\'on-Zygmund type operators. This is in contrast to the non-vector valued Euclidean case.