Differential Categories Revisited

Blute, Richard; Cockett, J. R. B.; Lemay, Jean-Simon Pacaud; Seely, R. A. G.

doi:10.48550/arxiv.1806.04804

Cited by 6 publications

(47 citation statements)

References 10 publications

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“…In particular we also discuss the natural transformations K and J (Definition 2.6), both of which play fundamental roles for the notion of antiderivatives. For a more complete story on differential categories, we refer the reader to [2,4], while for more details on the story of integration and antiderivatives, see [8,9].…”

Section: Differential Categories With Antiderivativesmentioning

confidence: 99%

“…The problem is that arbitrary coalgebra modalities do not necessarily extend to the finite biproduct completion. On the other hand, monoidal coalgebra modalities induce monoidal coalgebra modalities on the finite biproduct completion (see [2,Section 7] for more details). However, finite biproducts do not play an important techinical role in this paper, so we will continue without them.…”

Section: Differential Categories With Antiderivativesmentioning

confidence: 99%

“…It should be noted that the interchange rule [d.5] was not part of the definition in [4] but was later added to ensure that the coKleisli category of a differential category was a Cartesian differential category [5]. Many examples of differential categories can be found in [2,4].…”

Section: Differential Categories With Antiderivativesmentioning

confidence: 99%

“…For example, Hyland and Schalk provide a nice list of examples in [16,Section 2.4]. Examples of coalgebra modalities which are not monoidal can be found in [2].…”

Section: Differential Linear Categories With Antiderivativesmentioning

confidence: 99%

“…There are multiple equivalent ways of providing a monoidal coalgebra modality, some of which can be found in [2,26]. Of particular interest for this paper is via the Seely isomorphisms: Definition 3.4 A coalgebra modality (!, ρ, ε, ∆, e) on a symmetric monoidal category with finite products × and terminal object T is said to have the Seely isomorphisms [1,3,27] if the natural transformations χ A,B : !…”

Section: Differential Linear Categories With Antiderivativesmentioning

confidence: 99%

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Convenient Antiderivatives For Differential Linear Categories

Lemay¹

2018

Preprint

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Differential categories axiomatize the basics of differentiation and provide categorical models of differential linear logic. A differential category is said to have antiderivatives if a natural transformation K, which all differential categories have, is a natural isomorphism. Differential categories with antiderivatives come equipped with a canonical integration operator such that generalizations of the Fundamental Theorems of Calculus hold. In this paper, we show that Blute, Ehrhard, and Tasson's differential category of convenient vector spaces has antiderivatives. To help prove this result, we show that a differential linear category -which is a differential category with a monoidal coalgebra modality -has antiderivatives if and only if one can integrate over the monoidal unit and such that the Fundamental Theorems of Calculus hold. As well, we show that generalizations of the relational model (which are biproduct completions of complete semirings) are also differential categories with antiderivatives.Acknowledgements. The author would like to thank Kellogg College, the Clarendon Fund, and the Oxford-Google DeepMind Graduate Scholarship for financial support.

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Section: Differential Categories With Antiderivativesmentioning

confidence: 99%

Section: Differential Categories With Antiderivativesmentioning

confidence: 99%

Section: Differential Categories With Antiderivativesmentioning

confidence: 99%

“…For example, Hyland and Schalk provide a nice list of examples in [16,Section 2.4]. Examples of coalgebra modalities which are not monoidal can be found in [2].…”

Section: Differential Linear Categories With Antiderivativesmentioning

confidence: 99%

Section: Differential Linear Categories With Antiderivativesmentioning

confidence: 99%

See 3 more Smart Citations

Convenient Antiderivatives For Differential Linear Categories

Lemay¹

2018

Preprint

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Graded Differential Categories and Graded Differential Linear Logic

Lemay,

Vienney

2023

Electronic Notes in Theoretical Informatics and Computer Science

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In Linear Logic ($\mathsf{LL}$), the exponential modality $!$ brings forth a distinction between non-linear proofs and linear proofs, where linear means using an argument exactly once. Differential Linear Logic ($\mathsf{DiLL}$) is an extension of Linear Logic which includes additional rules for $!$ which encode differentiation and the ability of linearizing proofs. On the other hand, Graded Linear Logic ($\mathsf{GLL}$) is a variation of Linear Logic in such a way that $!$ is now indexed over a semiring $R$. This $R$-grading allows for non-linear proofs of degree $r \in R$, such that the linear proofs are of degree $1 \in R$. There has been recent interest in combining these two variations of $\mathsf{LL}$ together and developing Graded Differential Linear Logic ($\mathsf{GDiLL}$). In this paper we present a sequent calculus for $\mathsf{GDiLL}$, as well as introduce its categorical semantics, which we call graded differential categories, using both coderelictions and deriving transformations. We prove that symmetric powers always give graded differential categories, and provide other examples of graded differential categories. We also discuss graded versions of (monoidal) coalgebra modalities, additive bialgebra modalities, and the Seely isomorphisms, as well as their implementations in the sequent calculus of $\mathsf{GDiLL}$.

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Differential Algebras in Codifferential Categories

Lemay

2018

Preprint

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Differential categories were introduced by Blute, Cockett, and Seely as categorical models of differential linear logic and have since lead to abstract formulations of many notions involving differentiation such as the directional derivative, differential forms, smooth manifolds, De Rham cohomology, etc. In this paper we study the generalization of differential algebras to the context of differential categories by introducing T-differential algebras, which can be seen as special cases of Blute, Lucyshyn-Wright, and O'Neill's notion of T-derivations. As such, T-differential algebras are axiomatized by the chain rule and as a consequence we obtain both the higher-order Leibniz rule and the Faà di Bruno formula for the higher-order chain rule. We also construct both free and cofree T-differential algebras for suitable codifferential categories and discuss power series of T-algebras.Acknowledgements. The author would like to thank Kellogg College, the Clarendon Fund, and the Oxford-Google DeepMind Graduate Scholarship for financial support.

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Differential Categories Revisited

Cited by 6 publications

References 10 publications

Convenient Antiderivatives For Differential Linear Categories

Convenient Antiderivatives For Differential Linear Categories

Graded Differential Categories and Graded Differential Linear Logic

Differential Algebras in Codifferential Categories

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