Lp-improving convolution operators on finite quantum groups

Abstract

We characterize positive convolution operators on a finite quantum group G which are Lp-improving. More precisely, we prove that the convolution operator T:x x given by a state on C(G) satisfies \[ ∃1<p<2,\|T:Lp(G) L2(G)\|=1 \] if and only if the Fourier series satisfy \|(α)\|<1 for all nontrivial irreducible unitary representations α, if and only if the state ( S) is non-degenerate (where S is the antipode). We also prove that these Lp-improving properties are stable under taking free products, which gives a method to construct Lp-improving multipliers on infinite compact quantum groups. Our methods for non-degenerate states yield a general formula for computing idempotent states associated to Hopf images, which generalizes earlier work of Banica, Franz and Skalski.