Symmetric monoidal extensions and graph cobordisms between finite sets

Abstract

Given a symmetric monoidal (∞,n)-category C and a space X, we address the problem of explicitly describing the symmetric monoidal (∞,n)-category freely obtained from C by adjoining X new n-morphisms with prescribed sources and targets. We develop an apparatus of tools that allow one to detect in concrete situations such a free symmetric monoidal extension. As motivating application, we introduce a symmetric monoidal (∞,2)-category Gr of graph cobordisms between finite sets, following classical constructions of Gersten, Culler--Vogtmann and Hatcher--Vogtmann, and we exhibit it as an extension of the symmetric monoidal (∞,1)-category Fin of finite sets, obtained by freely adjoining a specific list of new 1-morphisms and 2-morphisms. We recover results of Barkan--Steinebrunner and of Galatius.