Rigid Algebras and Cospans
Abstract
We introduce rigid algebras, a generalization of rigid categories to arbitrary symmetric monoidal (∞,2)-categories. We develop their general theory, showing in particular that the a priori (∞,2)-category of rigid algebras is in fact an (∞,1)-category. For the (∞,2)-category of cospans in an (∞,1)-category C, we show that the (∞,1)-category of rigid commutative algebras is canonically identified with C. This identification is used to construct an adjunction between the cospan construction and the functor assigning to a symmetric monoidal (∞,2)-category its (∞,1)-category of rigid commutative algebras.
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