Free rigid commutative algebras

Abstract

We describe free rigid commutative algebras in 2-presentably symmetric monoidal (∞,2)-categories as oplax colimits over the 1-dimensional framed cobordism category. The special case of the (∞,2)-category PrL itself provides a description of the free symmetric monoidal (∞,1)-category with duals on a given (∞,1)-category, while the case of ModV(PrL) provides a description of a similar object in the V-enriched context, for V a presentably symmetric monoidal (∞,1)-category. As a byproduct, we obtain new proofs of some results about rigidification of locally rigid categories, as well as a proof that any rigid category over Sp embeds into a compactly-rigidly generated one.