Intermediate Subalgebras of Cartan embeddings in rings and C*-algebras

Abstract

Let D ⊂eq A be a quasi-Cartan pair of algebras. Then there exists a unique discrete groupoid twist G whose twisted Steinberg algebra is isomorphic to A in a way that preserves D. In this paper, we show there is a lattice isomorphism between wide open subgroupoids of G and subalgebras C such that D⊂eq C⊂eq A and D ⊂eq C is a quasi-Cartan pair. We also characterise which algebraic diagonal/algebraic Cartan/quasi-Cartan pairs have the property that every subalgebra C with D⊂eq C⊂eq A has D ⊂eq C a diagonal/Cartan/quasi-Cartan pair. In the diagonal case, when the coefficient ring is a field, it is all of them. Beyond that, only pairs that are close to being diagonal have this property. We then apply our techniques to C*-algebraic inclusions and give a complete characterization of which Cartan pairs D ⊂eq A have the property that every C*-subalgebra C with D⊂eq C⊂eq A has D ⊂eq C a Cartan pair.

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