Geometry of C*-algebras, the bidual of their projective tensor product, and completely bounded module maps

Abstract

Let A be a C*-algebra, and consider the Banach algebra A γ A, where γ denotes the projective Banach space tensor product; if A is commutative, this is the Varopoulos algebra VA. It has been an open problem for more than 35 years to determine precisely when A γ A is Arens regular. Even the situation for commutative A, in particular the case A = ∞, has remained unsolved. We solve this classical question for arbitrary C*-algebras by using von Neumann algebra and operator space methods, mainly relying on versions of the (commutative and non-commutative) Grothendieck Theorem, and the structure of completely bounded module maps. Establishing these links allows us to show that A γ A is Arens regular if and only if A has the Phillips property; equivalently, A is scattered and has the Dunford--Pettis Property. A further equivalent condition is that A* has the Schur property, or, again equivalently, the enveloping von Neumann algebra A** is finite atomic, i.e., a direct sum of matrix algebras. Hence, Arens regularity of A γ A is encoded in the geometry of the C*-algebra A. In case A is a von Neumann algebra, we conclude that A γ A is Arens regular (if and) only if A is finite-dimensional. For commutative C*-algebras A, we determine precisely the centre of the bidual, namely, Z(VA**) is Banach algebra isomorphic to A** eh A**, where eh denotes the extended Haagerup tensor product.