New tensor products of C*-algebras and characterization of type I C*-algebras as rigidly symmetric C*-algebras

Abstract

We construct several new classes of bifunctors (A,B) Aα B, where Aα B is a cross norm completion of A B for each pair of C*-algebras A and B. For the first class of bifunctors considered (A,B) Ap B (1≤ p≤∞), Ap B is a Banach algebra cross-norm completion of A B constructed in a fashion similar to p-pseudofunctions of a locally compact group. We also consider p,q for H\"older conjugate p,q∈ [1,∞] -- a Banach *-algebra analogue of the tensor product p. By taking enveloping C*-algebras of Ap,q B, we arrive at a third bifunctor (A,B) A C*p,q B where the resulting algebra A C*p,q B is a C*-algebra. For groups belonging to a large class of non-amenable discrete groups possessing both the rapid decay and Haagerup property, we show that the tensor products C* r(G1) C*p,q C* r(G2) coincide with a Brown-Guentner type C*-completion of 1(G1× G2) and conclude that if 2≤ p'<p≤∞, then the canonical quotient map C* r(G) C*p,q C* r(G) C* r(G) C*p',q' C* r(G) is not injective. A Banach *-algebra A is rigidly symmetric if Aγ B is symmetric for every C*-algebra B. A theorem of Kugler asserts that every type I C*-algebra is rigidly symmetric. Leveraging our new constructions, we establish the converse of Kugler's theorem by showing for C*-algebras A and B that AγB is symmetric if and only if A or B is type I.