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On antiramsey colorings of uncountable squares and geometry of nonseparable Banach spaces
- Prelegent(ci)
- Kamil Ryduchowski
- Afiliacja
- Doctoral School of Exact and Natural Sciences UW
- Termin
- 25 stycznia 2023 16:15
- Pokój
- p. 5050
- Seminarium
- Seminarium „Topologia i teoria mnogości”
A subset Z of a Banach space X is said to be r-equilateral (r-separated) if every two distinct elements of Z are in the distance exactly (at least) r from each other.
We will address the question of the existence of uncountable equilateral and (1 + e)-separated sets (e > 0) in the unit spheres of some nonseparable Banach spaces X induced by antiramsey colorings of pairs of countable ordinals.
The corollaries are that non(M) = \omega_1 implies
1) the existence of an equivalent renorming of the Hilbert space of density \omega_1 which does not admit any uncountable equilateral set
and
2) the existence of a nonseparable Hilbert generated Banach space containing an isomorphic copy of l_2 in each nonseparable subspace, whose unit sphere does not admit an uncountable equilateral set and does not admit an uncountable (1 + e)-separated set for any e > 0.
It turns out that in our approach additional set-theoretic axioms are inevitable, since under (MA + \neg CH) the geometry of the spaces under consideration is regular. The talk is based on a joint work with Piotr Koszmider:
https://arxiv.org/abs/2301.07413
This will be the last talk of this semester.
