BMO spaces of σ-finite von Neumann algebras and Fourier-Schur multipliers on SUq(2)

Abstract

We consider semi-group BMO spaces associated with an arbitrary σ-finite von Neumann algebra (M, ). We prove that the associated row and column BMO spaces always admit a predual, extending results from the finite case. Consequently, we can prove that the semi-group BMO spaces considered are Banach spaces and they interpolate with Lp as in the commutative situation, namely [BMO(M), Lp(M)]1/q ≈ Lpq(M). We then study a new class of examples. We introduce the notion of Fourier-Schur multiplier on a compact quantum group and show that such multipliers naturally exist for SUq(2).