A note on Henstock- Itô's non-stochastic integral

Lim, Clara Ying Yi; Toh, Tin Lam

doi:10.14321/realanalexch.47.2.1637314733

A note on Henstock- Itô's non-stochastic integral

URI

https://hdl.handle.net/10497/24907

Type

Article

Files

RAE-47-2-443.pdf (376.65 KB)

Citation

Lim, C. Y. Y., & Toh, T. L. (2022). A note on Henstock-Itô's non-stochastic integral. Real Analysis Exchange, 47(2), 443-460. https://doi.org/10.14321/realanalexch.47.2.1637314733

Author

Lim, Clara Ying Yi

•

Toh, Tin Lam

Abstract

It is well-known that the generalized Riemann approach using non-uniform mesh has given rise to integrals which are more general than the Riemann integral. In this note, motivated by earlier studies on stochastic integrals, we consider special interval-point pair in defining the Riemann sum, where the point (or the tag) is the left-hand point of the interval. We show that this approach in fact is equivalent to the Lebesgue integral. Hence this simplifies McShane's construction of interval-point pair. Moreover, by restricting to the tag as the left hand point of the interval, the integration-by-substitution and by-parts formulae become easy consequences of the definition.

Keywords

Date Issued

2022

Publisher

Michigan State University

Journal

Real Analysis Exchange

DOI

10.14321/realanalexch.47.2.1637314733

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A note on Henstock- Itô's non-stochastic integral