Pre-measure spaces and pre-integration spaces in predicative Bishop-Cheng measure theory

TL;DR

This paper develops a predicative framework for measure and integration theory, introducing pre-measure and pre-integration spaces within Bishop Set Theory to avoid impredicative constructions.

Contribution

It introduces pre-measure and pre-integration spaces as predicative variants of classical notions, adapting Bishop-Cheng measure theory within Bishop Set Theory.

Findings

Constructed pre-measure space of complemented subsets with Dirac measure

Showed pre-measure induces pre-integration space of simple functions

Developed predicative construction of L^1 as completion of integration space

Abstract

Bishop's measure theory (BMT) is an abstraction of the measure theory of a locally compact metric space $X$, and the use of an informal notion of a set-indexed family of complemented subsets is crucial to its predicative character. The more general Bishop-Cheng measure theory (BCMT) is a constructive version of the classical Daniell approach to measure and integration, and highly impredicative, as many of its fundamental notions, such as the integration space of $p$-integrable functions $L^p$, rely on quantification over proper classes (from the constructive point of view). In this paper we introduce the notions of a pre-measure and pre-integration space, a predicative variation of the Bishop-Cheng notion of a measure space and of an integration space, respectively. Working within Bishop Set Theory (BST), and using the theory of set-indexed families of complemented subsets and set-indexed families of real-valued partial functions within BST, we apply the implicit, predicative spirit of BMT to BCMT. As a first example, we present the pre-measure space of complemented detachable subsets of a set $X$ with the Dirac-measure, concentrated at a single point. Furthermore, we translate in our predicative framework the non-trivial, Bishop-Cheng construction of an integration space from a given measure space, showing that a pre-measure space induces the pre-integration space of simple functions associated to it. Finally, a predicative construction of the canonically integrable functions $L^1$, as the completion of an integration space, is included.