On polynomial functors and polynomial comonads over infinity groupoids

Abstract

We show that single-variable polynomial functors over the category S of infinity groupoids, as defined by Gepner-Haugseng-Kock, are exactly colimits of representable copresheaves indexed by infinity groupoid. This allows us to establish certain categorical properties of the ∞-category PolyS, in parallel with the case of the ordinary category Poly. We define the notion of polynomial comonad under the monoidal structure of PolyS induced by composition of polynomials, and describe a construction toward exploring the connection between polynomial comonads and complete Segal spaces. This construction partially generalizes the classical one given in the proof of a theorem of Ahman-Uustalu.