Automorphisms of Banach space projective tensor product of C*-algebras

Abstract

For unital C*-algebras A and B, we completely characterize the isometric (*-) automorphisms of their Banach space projective tensor product Aγ B. This leads to the characterization of inner and outer isometric *-automorphisms of Aγ B, as well. As an application, we provide a partial affirmative answer to a question posed by Kaijser and Sinclair, viz., we prove that for unital C*-algebras A and B, the set of norm-one unitaries of Aγ B coincides with U(A) U(B), where U(A) is the unitary group of A. We also establish the fact that the relative commutant of Aγ C 1 in A γ B is same as Z(A) γ B, where B is a subhomogenous unital C*-algebra, and A is any C*-algebra.