Normed modules and The Stieltjes integrations of functions defined on finite-dimensional algebras

TL;DR

This paper develops a framework for integrating functions on finite-dimensional algebras, extending classical integral concepts through various types of mappings and relationships between algebraic subsets.

Contribution

It introduces a generalized approach to integrals on finite-dimensional algebras, connecting them with classical integration methods via different types of mappings.

Findings

Established relationships between integrals on algebra subsets under various mappings.

Unified frameworks for Lebesgue-Stieltjes, Riemann-Stieltjes, and classical integrals.

Demonstrated how different mappings influence integral properties.

Abstract

We define integrals for functions on finite-dimensional algebras, adapting methods from Leinster's research. This paper discusses the relationships between the integrals of functions defined on subsets $\mathbb{I}_1 \subseteq {\mathit{\Lambda}}_1$ and $\mathbb{I}_2 \subseteq {\mathit{\Lambda}}_2$ of two finite-dimensional algebras, under the influence of a mapping $\omega$, which can be an injection or a bijection. We explore four specific cases: $\bullet$ $\omega$ as a monotone non-decreasing and right-continuous function; $\bullet$ $\omega$ as an injective, absolutely continuous function; $\bullet$ $\omega$ as a bijection; $\bullet$ and $\omega$ as the identity on $\mathbb{R}$. These scenarios correspond to the frameworks of Lebesgue-Stieltjes integration, Riemann-Stieltjes integration, substitution rules for Lebesgue integrals, and traditional Lebesgue or Riemann integration, respectively.