Add to ORKGBorel determinacy states that if $G(T,X) $ is a game and $X $ is Borel, then $G(T,X) $ is determined. Proved by Martin in 1975, Borel determinacy is a theorem of ZFC set theory, and is, in fact, the best determinacy result in ZFC. However, the proof uses sets of high set theoretic type ($\aleph_1 $ many power sets of $\omega$). Friedman proved in 1971 that these sets are necessary by showing that the Axiom of Replacement is necessary for any proof of Borel Determinacy. To prove this, Friedman produces a model of ZC and a Borel set of Turing degrees that neither contains nor omits a cone; so by another theorem of Martin, Borel Determinacy is not a theorem of ZC. This paper contains three main sections: Martin's proof of Borel Determinac...
Abstract. We survey the recent developments in the investigation of Blackwell determinacy axioms. It...
Let ω = {0, 1, 2, ... } be the set of natural numbers and R = ω^ω the set of all infinite sequences ...
Let ω = {0, 1, 2, ... } be the set of natural numbers and R = ω^ω the set of all infinite sequences ...
Borel determinacy states that if G(T;X) is a game and X is Borel, then G(T;X) is determined. Proved ...
We study the strength of determinacy hypotheses in levels of two hierarchies of subsets of Baire spa...
The study of games, and the determinacy thereof, has become incredibly important in modern day set t...
Abstract. We introduce a new method, involving infinite games and Borel determinacy, which we use to...
This thesis will be primarily focused on directly proving that the determinacy of Borel games in X^ω...
This thesis will be primarily focused on directly proving that the determinacy of Borel games in X^ω...
Just as traditional games can be represented by trees, so concurrent games can be represented by eve...
Working within the Zermelo-Frankel Axioms of set theory, we will introduce two important contradicto...
Esta dissertação discute alguns tópicos de teoria descritiva de conjuntos. Os assuntos abordados são...
Schmidt's game is a powerful tool for studying properties of certain sets which arise in Diophantine...
Many well-known determinacy results calibrate determinacy strength in terms of large cardinals (e.g....
AbstractWe study the determinacy of the game Gκ(A) introduced in Fuchino, Koppelberg and Shelah (to ...
Abstract. We survey the recent developments in the investigation of Blackwell determinacy axioms. It...
Let ω = {0, 1, 2, ... } be the set of natural numbers and R = ω^ω the set of all infinite sequences ...
Let ω = {0, 1, 2, ... } be the set of natural numbers and R = ω^ω the set of all infinite sequences ...
Borel determinacy states that if G(T;X) is a game and X is Borel, then G(T;X) is determined. Proved ...
We study the strength of determinacy hypotheses in levels of two hierarchies of subsets of Baire spa...
The study of games, and the determinacy thereof, has become incredibly important in modern day set t...
Abstract. We introduce a new method, involving infinite games and Borel determinacy, which we use to...
This thesis will be primarily focused on directly proving that the determinacy of Borel games in X^ω...
This thesis will be primarily focused on directly proving that the determinacy of Borel games in X^ω...
Just as traditional games can be represented by trees, so concurrent games can be represented by eve...
Working within the Zermelo-Frankel Axioms of set theory, we will introduce two important contradicto...
Esta dissertação discute alguns tópicos de teoria descritiva de conjuntos. Os assuntos abordados são...
Schmidt's game is a powerful tool for studying properties of certain sets which arise in Diophantine...
Many well-known determinacy results calibrate determinacy strength in terms of large cardinals (e.g....
AbstractWe study the determinacy of the game Gκ(A) introduced in Fuchino, Koppelberg and Shelah (to ...
Abstract. We survey the recent developments in the investigation of Blackwell determinacy axioms. It...
Let ω = {0, 1, 2, ... } be the set of natural numbers and R = ω^ω the set of all infinite sequences ...
Let ω = {0, 1, 2, ... } be the set of natural numbers and R = ω^ω the set of all infinite sequences ...