Normalizers and Approximate Units for Inclusions of C*-Algebras

Abstract

For an inclusion of C*-algebras D⊂eq A with D abelian, we show that when n∈ A normalizes D, n*n and nn* commute with D. As a corollary, when D is a regular MASA in A, every approximate unit for D is also an approximate unit for A. This permits removal of the non-degeneracy hypothesis from the definition of a Cartan MASA in the non-unital case. We give examples of singular MASA inclusions: for some, every approximate unit for D is an approximate unit for A, while for others, no approximate unit for D is an approximate unit for A. Our results imply that if the unitization of an inclusion D⊂eq A is a C*-diagonal, then D is regular in A. In contrast, we give an example of a non-regular inclusion whose unitization is a Cartan inclusion. If D is a MASA in A, we ask when A is a subalgebra of B with D a regular MASA in B. When D is a MASA in B(2( N)), no such B exists.