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Let $(X, 𝕀)$ be a Polish ideal space and let $T$ be any set. We show that under some conditions on a relation $R \subseteq T^{2} \times X$ it is possible to find a set $A \subseteq T$ such that $R (A^{2})$ is completely $𝕀$ -nonmeasurable, i.e, it is $𝕀$ -nonmeasurable in every positive Borel set. We also obtain such a set $A \subseteq T$ simultaneously for continuum many relations ${(R_{α})}_{α < 2^{ω}} .$ Our results generalize those from the papers of K. Ciesielski, H. Fejzić, C. Freiling and M. Kysiak.

On nonmeasurable selectors of countable group actions

Piotr Zakrzewski (2009)

Fundamenta Mathematicae

Given a set X, a countable group H acting on it and a σ-finite H-invariant measure m on X, we study conditions which imply that each selector of H-orbits is nonmeasurable with respect to any H-invariant extension of m.

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Displaying 121 – 140 of 344

On Measurability of Uncountable Unions of Measurable Sets

On measurable relation

On measurable solutions of a functional equation and its application to information theory

On measure repleteness and support for lattice regular measures.

On measure zero sets in topological vector spaces.

On measures connected with the Cauchy equation.

On measures connected with the Cauchy equation. (Short Communication).

On minimal generators of σ-fields

On modular set functions and measures

On multiplicity functions and Lebesgue area

On natural invariant measures on generalised iterated function systems.

On Nikodym-type sets in high dimensions

On nonmeasurable images

On nonmeasurable selectors of countable group actions

On nonmeasurable subgroups of the real line.

On nonparadoxical sets

On normal and strongly normal lattices.

On normal lattices and separation and semi-separation of lattices.

On normal lattices and Wallman spaces.

On one generalization of the weakly compactly generated B-spaces

Currently displaying 121 – 140 of 344