The surface category and tropical curves

Abstract

We compute the classifying space of the surface category hBord2 whose objects are closed oriented 1-manifolds and whose morphisms are diffeomorphism classes of oriented surface bordisms, and show that it is rationally equivalent to a circle. It is hence much smaller than the classifying space of the topologically enriched surface category Bord2 studied by Galatius-Madsen-Tillmann-Weiss. However, we also show that for the wide subcategory hBord2 0 ⊂ hBord2 that contains all morphisms without disks or spheres, the classifying space B(hBord20) is surprisingly large. Its rational homotopy groups contain the homology of all moduli spaces of tropical curves g as a summand. The technical key result shows that a version of positive boundary surgery applies to a large class of discrete symmetric monoidal categories, which we call labelled cospan categories. We also use this to show that the (2,1)-category of cospans of finite sets has a contractible classifying space.