On strong Arens irregularity of projective tensor product of Hilbert-Schmidt space

Abstract

It was shown in [16] that the Banach algebra A:=S2(2)γ S2(2) is not Arens regular, where S2(2) denotes the Banach algebra of the Hilbert-Schmidt operators on 2. In this article, employing the notion of limits along ultrafilters, we prove that the irregularity of S2(2)γ S2(2) is not strong. Along the way, we provide a class of functionals in A** which lie in the topological center but are not in A; and, as a consequence, we deduce that A** is not an annihilator Banach algebra with respect to any of the two Arens products.