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Coverings of Banach spaces and their subsets by hyperplanes

Speaker(s)
Damian Głodkowski
Affiliation
University of Warsaw
Date
March 17, 2021, 4:15 p.m.
Information about the event
Zoom
Seminar
Topology and Set Theory Seminar

A hyperplane of a Banach space is a closed one-codimensional subspace. Hyperplanes are nowhere dense and so, no countable collection of hyperplanes can cover the entire space. Given a Banach space we consider the \sigma-ideal of all of its subsets which are covered by countably many hyperplanes and investigate its standard cardinal characteristics as the additivity, the covering number, the uniformity, the cofinality. We completely determine their values for separable Banach spaces in ZFC, and for all nonseparable Banach spaces under additional assumptions such as GCH or MM. We also find an application of our results to the topic of overcomplete sets in Banach spaces. Based on: https://arxiv.org/pdf/2103.05097.pdf