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Null-additive sets and the property gamma
- Prelegent(ci)
- Piotr Szewczak
- Afiliacja
- Cardinal Wyszyński University in Warsaw
- Termin
- 11 grudnia 2019 16:15
- Pokój
- p. 5050
- Seminarium
- Seminarium „Topologia i teoria mnogości”
A subset X of the real line is null-additive if for each null set Y, the set X+Y is null. Under Martin Axiom, Galvin nad Miller constructed an uncountable null-additive set whose continuous images are also null-additive; this set has the property gamma, a strong combinatorial covering property. Bartoszyński and Recław proved that, assuming p=c, there is a gamma set that is not null additive. The aim of the talk is to construct sets with the above properties, using weaker set-theoretic assumptions. This is a joint work with Tomasz Weiss.
