Analysis of the Regularity of a Measurement on a Metric Space
Emilien LORANU LONDJIRINGA
Section of Exact Sciences, Department of Mathematics and Physics, ISP BUNIA, Ituri, DR Congo.
Camile LIKOTELO BINENE *
Department of Mathematics, Statistics and Computer Science, Faculty of Science and Technology, National Pedagogical University, Kinshasa, DR Congo.
Grâce NKWESE MAZONI
Department of Mathematics, Statistics and Computer Science, Faculty of Science and Technology, National Pedagogical University, Kinshasa, DR Congo.
Christian AMINI HURUMA
Secondary School of Jean-Marie de la Mennais, FIC/BUNIA, Bunia, DR Congo.
Cauchy MBAKAS'A KONGOLO
Department of Mathematics, Statistics and Computer Science, Faculty of Science and Technology, National Pedagogical University, Kinshasa, DR Congo.
Fidele MUAKU MVUNZI
Department of Mathematics, Statistics and Computer Science, Faculty of Science and Technology, National Pedagogical University, Kinshasa, DR Congo.
*Author to whom correspondence should be addressed.
Abstract
The aim of this study is to demonstrate that, although it is difficult to provide a precise and exhaustive description of Borel sigma-algebra, it is often possible to frame the measure of any Borel set with arbitrary precision. That is, for any given Borel set, one can identify an open set that contains it and a closed (or compact) set that encompasses it. This approach allows one to establish upper and lower bounds for the measure, which facilitates the analysis of the properties of Borel sets. This inclusion process is essential because it allows one to work with approximations while maintaining mathematical rigor. The use of open and closed sets allows one to better understand the structure of Borel sets, even without a detailed description. This opens the way to practical applications in various areas of real analysis and set theory, where the notion of measure is fundamental. Moreover, this inclusion method offers interesting perspectives for theoretical research. By exploring the relationships between Borel sets and other classes of sets, we can develop more robust mathematical tools. Moreover, although the precise characterization of the Borel sigma-algebra may elude us, inclusion techniques allow us to efficiently navigate the complex landscape of measurable sets while providing meaningful results for the theory and its applications.
Keywords: Borelian tribe, finite measure, externally regular, lower regular, regular compactness, closed open, compact metric space