p-nuclearity of Lp-operator crossed products

Abstract

Let (X,B,μ) be a measure space and A be a norm closed subalgebra of B(Lp(X,μ)), where p∈ [1,∞). Let (G,A,α) be an Lp-operator algebra dynamical system, where G is a countable discrete amenable group. We prove that the full Lp-operator crossed product Fp(G,A,α) is p-nuclear if and only if A is p-nuclear provided the action α of G on A is p-completely isometric. As applications, we prove that Lp-Cuntz algebras and rotation Lp-operator algebras are p-nuclear. Our results solve a problem raised by N. C. Phillips concerning p-nuclearity for Lp-Cuntz algebras.