Invariant means on subspaces of quantum weakly almost periodic functionals

Abstract

Let M be a Hopf--von Neuman algebra with the predual M* and WAP(M) the subspace in M composed of weakly almost periodic functionals on M*. The main example of such an algebra is M=L∞( G) for a locally compact quantum group G. We define a pair of left/right spaces WAPiso,l(M) and WAPiso,r(M) inside WAP(M) and prove that they carry invariant means. These spaces are currently the widest known to admit invariant means in the quantum setting. In the case when M=L∞(G) and G is a locally compact group, these spaces are equal to WAP(G).