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Main Authors: Raab, Clemens G., Regensburger, Georg
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2301.13134
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author Raab, Clemens G.
Regensburger, Georg
author_facet Raab, Clemens G.
Regensburger, Georg
contents In this paper, we study the consequences of the fundamental theorem of calculus from an algebraic point of view. For functions with singularities, this leads to a generalized notion of evaluation. We investigate properties of such integro-differential rings and discuss many examples. We also construct corresponding integro-differential operators and provide normal forms via rewrite rules. They are then used to derive several identities and properties in a purely algebraic way, generalizing well-known results from analysis. In identities like shuffle relations for nested integrals and the Taylor formula, additional terms are obtained that take singularities into account. Another focus lies on treating basics of linear ODEs in this framework of integro-differential operators. These operators can have matrix coefficients, which allow to treat systems of arbitrary size in a unified way. In the appendix, using tensor reduction systems, we give the technical details of normal forms and prove them for operators including other functionals besides evaluation.
format Preprint
id arxiv_https___arxiv_org_abs_2301_13134
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle The fundamental theorem of calculus in differential rings
Raab, Clemens G.
Regensburger, Georg
Rings and Algebras
Operator Algebras
12H05, 16S32 (Primary) 16S15, 34A30, 47G20 (Secondary)
In this paper, we study the consequences of the fundamental theorem of calculus from an algebraic point of view. For functions with singularities, this leads to a generalized notion of evaluation. We investigate properties of such integro-differential rings and discuss many examples. We also construct corresponding integro-differential operators and provide normal forms via rewrite rules. They are then used to derive several identities and properties in a purely algebraic way, generalizing well-known results from analysis. In identities like shuffle relations for nested integrals and the Taylor formula, additional terms are obtained that take singularities into account. Another focus lies on treating basics of linear ODEs in this framework of integro-differential operators. These operators can have matrix coefficients, which allow to treat systems of arbitrary size in a unified way. In the appendix, using tensor reduction systems, we give the technical details of normal forms and prove them for operators including other functionals besides evaluation.
title The fundamental theorem of calculus in differential rings
topic Rings and Algebras
Operator Algebras
12H05, 16S32 (Primary) 16S15, 34A30, 47G20 (Secondary)
url https://arxiv.org/abs/2301.13134