Control Measures for Bochner $L_{0}$-Valued Vector Measures

Lech Drewnowski; Alexandre Reggiolli Teixeira

arXiv:2603.19392·math.FA·March 23, 2026

Control Measures for Bochner $L_{0}$-Valued Vector Measures

Lech Drewnowski, Alexandre Reggiolli Teixeira

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TL;DR

This paper extends the control measure theorem to vector measures valued in Bochner spaces over a finite measure, establishing new control and bounded multiplier properties in this context.

Contribution

It generalizes Talagrand's control measure theorem to Bochner $L_0$-valued vector measures, providing new control measures and relations to bounded multiplier properties.

Findings

01

Control measure theorem holds for $L_0(mu,Z)$-valued vector measures.

02

Established a Rybakov type control result for these measures.

03

Explored relations to bounded multiplier properties of $F$-spaces.

Abstract

It is shown that for any finite positive measure $μ$ defined on a measure space $(S, Σ)$ , and any Banach or Fr\'echet space $Z$ , the control measure Theorem of Talagrand (T) is true for the case when the (stochastic) vector measure $m : E \to L_{0} (μ, Z)$ , defined on another measurable space $(E, E)$ , takes values in $L_{0} (μ, Z)$ , the Bochner space of vector-valued functions associated to $μ$ and $Z$ . As a consequence, we also obtain a Rybakov type result for this control. Finally, we give the relation of this result to bounded multiplier properties (BMP) of $F$ -spaces and pose various open problems related to it.

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Taxonomy

TopicsAdvanced Banach Space Theory · Nonlinear Differential Equations Analysis · Stochastic processes and financial applications