This article investigates duals for bimodule categories over finite tensor
categories. We show that finite bimodule categories form a tricategory and
discuss the dualities in this tricategory using inner homs. We consider
inner-product bimodule categories over pivotal tensor categories with
additional structure on the inner homs. Inner-product module categories are
related to Frobenius algebras and lead to the notion of ∗-Morita equivalence
for pivotal tensor categories. We show that inner-product bimodule categories
form a tricategory with two duality operations and an additional pivotal
structure. This is work is motivated by defects in topological field theories.Comment: 64 pages, comments are welcom
