Extracting an N-filtered differential modality from a differential modality

Abstract

A differential modality is a comonad on an additive symmetric monoidal category (C,,I), whose underlying functor we denote !C → C, together with some additional structure including a differential operator ∂!A A → !A. A morphism f !A → B is interpreted as a smooth function from A to B. The notion of an N-filtered differential modality is a variant in which a notion of degree is present. Instead of a single functor ! C → C, we ask for a family of functors ! nC → C where n ∈ N. Now, a morphism f ! n A → B is interpreted as a smooth function from A to B, with degree less than n for some notion of degree. We prove that under mild conditions, every differential modality on an additive symmetric monoidal category with underlying functor ! C → C yields an N-filtered differential modality with underlying functors ! nC → C. A morphism f ! nA → B corresponds to a polynomial map of degree less than n from A to B, in the sense that the (n+1)-th derivative of f is 0.