Integral Categories and Calculus Categories
From MaRDI portal
Publication:5111187
DOI10.4230/LIPICS.CSL.2017.20zbMATH Open1440.18029arXiv1707.08211MaRDI QIDQ5111187
Publication date: 26 May 2020
Abstract: Differential categories are now an established abstract setting for differentiation. However not much attention has been given to the process which is inverse to differentiation: integration. This paper presents the parallel development for integration by axiomatizing an integral transformation, , in a symmetric monoidal category with a coalgebra modality. When integration is combined with differentiation, the two fundamental theorems of calculus are expected to hold (in a suitable sense): a differential category with integration which satisfies these two theorem is called a {em calculus category/}. Modifying an approach to antiderivatives by T. Ehrhard, we define having antiderivatives as the demand that a certain natural transformation, , is invertible. We observe that a differential category having antiderivatives, in this sense, is always a calculus category. When the coalgebra modality is monoidal, it is natural to demand an extra coherence between integration and the coalgebra modality. In the presence of this extra coherence we show that a calculus category with a monoidal coalgebra modality has its integral transformation given by antiderivatives and, thus, that the integral structure is uniquely determined by the differential structure. The paper finishes by providing a suite of separating examples. Examples of differential categories, integral categories, and calculus categories based on both monoidal and (mere) coalgebra modalities are presented. In addition, differential categories which are not integral categories are discussed and vice versa.
Full work available at URL: https://arxiv.org/abs/1707.08211
Categories in geometry and topology (18F99) Proof-theoretic aspects of linear logic and other substructural logics (03F52) Monoidal categories, symmetric monoidal categories (18M05)
Related Items (3)
[[Publication:5507031|Title not available (Why is that?)]] ⋮ The rôle of categorical structures in infinitesimal calculus ⋮ [[Publication:4839145|Title not available (Why is that?)]]
This page was built for publication: Integral Categories and Calculus Categories
Report a bug (only for logged in users!)Click here to report a bug for this page (MaRDI item Q5111187)
