Add to ORKGAbstract. We analyze a natural function definable from a scale at a singular cardinal, and use it to obtain some strong negative square-brackets partition relations at successors of singular cardinals. The proof of our main result makes use of club-guessing, and as a corollary we obtain a fairly easy proof of a difficult result of Shelah connecting weak saturation of a certain club-guessing ideal with strong failures of square-brackets partition relations. We then investigate the strength of weak saturation of such ideals and obtain some results on stationary reflection. 1
We determine exact consistency strengths for various failures of the Singular Cardinals Hypothesis (...
This paper investigates the relations K+--t (a): and its variants for uncountable cardinals K. First...
In [HM] it was shown that if κ is a strong partition cardinal then every function from [κ] κ to [κ] ...
AbstractSuppose that λ is the successor of a singular cardinal μ whose cofinality is an uncountable ...
In this paper we study the relationship between AD and strong partition properties of cardinals as w...
AbstractWe obtain very strong coloring theorems at successors of singular cardinals from failures of...
This paper discusses models of set theory without the Axiom of Choice. We investigate all possible p...
Abstract. This paper discusses models of set theory without the Axiom of Choice. We investigate all ...
Assuming the axiom of determinacy, we give a new proof of the strong partition relation on ω1. Furth...
We prove that Galvin's property consistently fails at successors of strong limit singular cardinals....
AbstractThis paper investigates the relations κ+ → (α)22 and its variants for uncountable cardinals ...
In this paper we analyze the PCF structure of a generic extension by the main forcing from our previ...
Abstract. Starting from a supercompact cardinal κ, we build a model, in which κ is singular string l...
Abstract. We obtain very strong coloring theorems at successors of singular cardinals from failures ...
International audienceLet κ be a regular uncountable cardinal, and λ be a cardinal greater than κ. O...
We determine exact consistency strengths for various failures of the Singular Cardinals Hypothesis (...
This paper investigates the relations K+--t (a): and its variants for uncountable cardinals K. First...
In [HM] it was shown that if κ is a strong partition cardinal then every function from [κ] κ to [κ] ...
AbstractSuppose that λ is the successor of a singular cardinal μ whose cofinality is an uncountable ...
In this paper we study the relationship between AD and strong partition properties of cardinals as w...
AbstractWe obtain very strong coloring theorems at successors of singular cardinals from failures of...
This paper discusses models of set theory without the Axiom of Choice. We investigate all possible p...
Abstract. This paper discusses models of set theory without the Axiom of Choice. We investigate all ...
Assuming the axiom of determinacy, we give a new proof of the strong partition relation on ω1. Furth...
We prove that Galvin's property consistently fails at successors of strong limit singular cardinals....
AbstractThis paper investigates the relations κ+ → (α)22 and its variants for uncountable cardinals ...
In this paper we analyze the PCF structure of a generic extension by the main forcing from our previ...
Abstract. Starting from a supercompact cardinal κ, we build a model, in which κ is singular string l...
Abstract. We obtain very strong coloring theorems at successors of singular cardinals from failures ...
International audienceLet κ be a regular uncountable cardinal, and λ be a cardinal greater than κ. O...
We determine exact consistency strengths for various failures of the Singular Cardinals Hypothesis (...
This paper investigates the relations K+--t (a): and its variants for uncountable cardinals K. First...
In [HM] it was shown that if κ is a strong partition cardinal then every function from [κ] κ to [κ] ...