On measurability of Kurzweil--Stieltjes integrable functions on compact lines

Abstract

We continue the study on Kurzweil--Stieltjes integration on compact lines initiated in [doi:10.1007/s11117-025-01161-9]. Given a real valued function G on a compact line, the presented integral is called the Kurzweil--Stieltjes integral with respect to G, or simply the G-integral. %Given a compact line K and a right-continuous function G:K of bounded variation, we consider the Radon measure μG naturally induced by G. Our main results concern the relationship between G-integrability and measurability. We prove that, whenever G is nondecreasing, every G-integrable function is μG-measurable, where μG is the natural Radon measure induced by G. We also show that, for an arbitrary G of bounded variation, every bounded G-integrable function is μG-measurable. %, where |μG| denotes the total variation measure of μG. As an application, we provide a full characterization of Lebesgue integrablility with respect to Radon measures in terms of the G-integral, and demonstrate that the G-integral represents an extension of the Lebesgue integral with respect to μG for suitable G. In addition, we establish a version of Hake's theorem for the G-integral in this setting.