Orthogonal 1-sets and extreme non-Arens regularity of preduals of von Neumann algebras

Abstract

We propose a new definition for a Banach algebra A to be extremely non-Arens regular, namely that the quotient A/WAP(A) of A with the space of its weakly almost periodic elements contains an isomorphic copy of A. This definition is simpler and formally stronger than the original one introduced by Granirer in the nineties. We then identify sufficient conditions for the predual V of a von Neumann algebra V to be extremely non-Arens regular in this new sense. These conditions are obtained with the help of orthogonal 1-sets of V. We show that some of the main algebras in Harmonic Analysis satisfy these conditions. Among them,there is the weighted semigroup algebra of any weakly cancellative discrete semigroup, for any diagonally bounded weight, the weighted group algebra of any non-discrete locally compact infinite group and for any weight, the weighted measure algebra of any locally compact infinite group, for any diagonally bounded weight, the Fourier algebra of any locally compact infinite group having its local weight greater or equal than its compact covering number, the Fourier algebra of any countable discrete group containing an infinite amenable subgroup.