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arxiv: 1711.04645 · v1 · pith:DTD5NG4Dnew · submitted 2017-11-08 · 🧮 math.GN

Measurability of Intersections of Measurable Multifunctions

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keywords measurablemultifunctionsintersectionsmeasurabilitymultifunctionpartresultsapply
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We prove universal compact-measurability of the intersection of a compact-measurable Souslin family of closed-valued multifunctions. This generalizes previous results on intersections of measurable multifunctions. We introduce the unique maximal part of a multifunction which is defined on the quotient given by an equivalence relation. Measurability of this part of a multifunction is proven in a special case. We show how these results apply to the spectral theory of measurable families of closed linear operators.

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