Yurii Khomskii scite author profile

We study maximal independent families (m.i.f.) in the projective hierarchy. We show that (a) the existence of a Σ 1 2 m.i.f. is equivalent to the existence of a Π 1 1 m.i.f., (b) in the Cohen model, there are no projective maximal independent families, and (c) in the Sacks model, there is a Π 1 1 m.i.f. We also consider a new cardinal invariant related to the question of destroying or preserving maximal independent families. ∀X ∈ [ω] ω ∃a 1 , . . . , a n , b 1 , . . . , b ℓ ∈ I s.t. σ(ā;b) ⊆ * X or σ(ā;b) ∩ X = * ∅.

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Questions on generalised Baire spaces

Khomskii

Laguzzi

Löwe

et al. 2016

Mathematical Logic Qtrly

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Mad Families Constructed from Perfect Almost Disjoint Families

Brendle

Khomskii

2013

J. symb. log.

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We prove the consistency of together with the existence of a -definable mad family, answering a question posed by Friedman and Zdomskyy in [7, Question 16]. For the proof we construct a mad family in L which is an ℵ1-union of perfect a.d. sets, such that this union remains mad in the iterated Hechler extension. The construction also leads us to isolate a new cardinal invariant, the Borel almost-disjointness number, defined as the least number of Borel a.d. sets whose union is a mad family. Our proof yields the consistency of (and hence, ).

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Regularity properties on the generalized reals

Friedman

Khomskii

Kulikov

2016

Annals of Pure and Applied Logic

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Measure, category and projective wellorders

Fischer

Friedman²,

Khomskii³

2015

JLA

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We investigate the sample path properties of Martin-Löf random Brownian motion. We show (1) that many classical results which are known to hold almost surely hold for every Martin-Löf random Brownian path, (2) that the effective dimension of zeroes of a Martin-Löf random Brownian path must be at least 1/2, and conversely that every real with effective dimension greater than 1/2 must be a zero of some Martin-Löf random Brownian path, and (3) we will demonstrate a new proof that the solution to the Dirichlet problem in the plane is computable.

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Yurii Khomskii

Definable maximal independent families

Questions on generalised Baire spaces

Mad Families Constructed from Perfect Almost Disjoint Families

Regularity properties on the generalized reals

Measure, category and projective wellorders

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