Structures on Categories of Polynomials

Abstract

We define the monoidal category (PolyE,y,) of polynomials under composition in any category E with finite limits, including both cartesian and vertical morphisms of polynomials, and generalize to this setting the Dirichlet tensor product of polynomials , duoidality of and , closure of , and coclosures of . We also prove that -comonoids in PolyE are precisely the internal categories in E whose source morphism is exponentiable, generalizing a result of Ahman-Uustalu equating categories with polynomial comonads, and show that coalgebras in this setting correspond to internal copresheaves. Finally, the double category of ``typed'' polynomials in E is recovered using -bicomodules in PolyE.