Nuclear dimension for an inclusion of unital C*-algebras

Abstract

Let P ⊂ A be an inclusion of separable unital C*-algebras with finite Watatani index. Suppose that E A → P has the Rokhlin property, that is, there is a projection e ∈ A' A∞ such that E∞(e) = ( IndexE)-11. We show that if A has nuclear dimension n, then P has nuclear dimension less than or equal to n. In particular, if an action α of a finite group G on A has the Rokhlin property, then the nuclear dimension of the crossed product algebra A α G is less than or equal to that of A.