In this paper we study the relationship between AD and strong partition properties of cardinals as well as some consequences of these properties themselves
The partition property for measures on Pℋλ was formulated by analogy with a property which Rowbottom...
The axiom of determinateness (AD), first studied by Mycielski and Steinhaus (see [11] and [15]), pos...
This paper investigates the relations K+--t (a): and its variants for uncountable cardinals K. First...
In this paper we study the relationship between AD and strong partition properties of cardinals as w...
It is shown that, within L(R), the smallest inner model of set theory containing the reals, the axio...
In [HM] it was shown that if κ is a strong partition cardinal then every function from [κ] κ to [κ] ...
This thesis is in the field of Descriptive Set Theory and examines some consequences of the Axiom of...
In this paper we explore coloring theorems for the reals, its quotients, cardinals, and their combin...
Assuming the axiom of determinacy, we give a new proof of the strong partition relation on ω1. Furth...
In this paper, we give a thorough and basic introduction to the main techniques dealing with computa...
We study determinacy from the perspective of inner model theory. In this thesis, there are three mai...
This paper discusses models of set theory without the Axiom of Choice. We investigate all possible p...
summary:We study cardinal coefficients related to combinatorial properties of partitions of $\omega$...
Abstract. This paper discusses models of set theory without the Axiom of Choice. We investigate all ...
Abstract. We analyze a natural function definable from a scale at a singular cardinal, and use it to...
The partition property for measures on Pℋλ was formulated by analogy with a property which Rowbottom...
The axiom of determinateness (AD), first studied by Mycielski and Steinhaus (see [11] and [15]), pos...
This paper investigates the relations K+--t (a): and its variants for uncountable cardinals K. First...
In this paper we study the relationship between AD and strong partition properties of cardinals as w...
It is shown that, within L(R), the smallest inner model of set theory containing the reals, the axio...
In [HM] it was shown that if κ is a strong partition cardinal then every function from [κ] κ to [κ] ...
This thesis is in the field of Descriptive Set Theory and examines some consequences of the Axiom of...
In this paper we explore coloring theorems for the reals, its quotients, cardinals, and their combin...
Assuming the axiom of determinacy, we give a new proof of the strong partition relation on ω1. Furth...
In this paper, we give a thorough and basic introduction to the main techniques dealing with computa...
We study determinacy from the perspective of inner model theory. In this thesis, there are three mai...
This paper discusses models of set theory without the Axiom of Choice. We investigate all possible p...
summary:We study cardinal coefficients related to combinatorial properties of partitions of $\omega$...
Abstract. This paper discusses models of set theory without the Axiom of Choice. We investigate all ...
Abstract. We analyze a natural function definable from a scale at a singular cardinal, and use it to...
The partition property for measures on Pℋλ was formulated by analogy with a property which Rowbottom...
The axiom of determinateness (AD), first studied by Mycielski and Steinhaus (see [11] and [15]), pos...
This paper investigates the relations K+--t (a): and its variants for uncountable cardinals K. First...
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