Publication date
August 2000
DOI Publisher
Elsevier Science B.V. ISSN
0166-8641Abstract
AbstractThis paper addresses the topological partition relations of the form 2ω1→(ω1+1)12 and Σℵ2{0,1}→(ω1)1n , and in the latter case it completes the picture
AbstractThis paper addresses the topological partition relations of the form 2ω1→(ω1+1)12 and Σℵ2{0,1}→(ω1)1n , and in the latter case it completes the picture
We look for partition theorems for large subtrees for suitable uncountable trees and colourings. We ...
summary:We study cardinal coefficients related to combinatorial properties of partitions of $\omega$...
AbstractTo every infinite sequence of positive integers m→={mi:i∈ω}, we associate two fields of sets...
AbstractThis paper addresses the topological partition relations of the form 2ω1→(ω1+1)12 and Σℵ2{0,...
grantor: University of TorontoThe subject matter of this exposition is the study of partit...
grantor: University of TorontoThe subject matter of this exposition is the study of partit...
AbstractTodorčević has shown that there is a ccc extension M in which MAω1 + 2ω = ω2 holds and also ...
AbstractWe carry out the task given by the title, introduce a combinatorial principle, and use it to...
AbstractSteprāns provided a characterization of βN⧹N in the ℵ2-Cohen model that is much in the spiri...
We look for partition theorems for large subtrees for suitable uncountable trees and colourings. The...
AbstractA 1-??? correspondence is established between partitions of a positive integer n of the form...
AbstractContinuing the earlier research from [T. Bigorajska, H. Kotlarski, Partitioning α-large sets...
AbstractThe general question, “When is the product of Fréchet spaces Fréchet?” really depends on the...
We look for partition theorems for large subtrees for suitable uncountable trees and colourings. We ...
summary:We study cardinal coefficients related to combinatorial properties of partitions of $\omega$...
We look for partition theorems for large subtrees for suitable uncountable trees and colourings. We ...
summary:We study cardinal coefficients related to combinatorial properties of partitions of $\omega$...
AbstractTo every infinite sequence of positive integers m→={mi:i∈ω}, we associate two fields of sets...
AbstractThis paper addresses the topological partition relations of the form 2ω1→(ω1+1)12 and Σℵ2{0,...
grantor: University of TorontoThe subject matter of this exposition is the study of partit...
grantor: University of TorontoThe subject matter of this exposition is the study of partit...
AbstractTodorčević has shown that there is a ccc extension M in which MAω1 + 2ω = ω2 holds and also ...
AbstractWe carry out the task given by the title, introduce a combinatorial principle, and use it to...
AbstractSteprāns provided a characterization of βN⧹N in the ℵ2-Cohen model that is much in the spiri...
We look for partition theorems for large subtrees for suitable uncountable trees and colourings. The...
AbstractA 1-??? correspondence is established between partitions of a positive integer n of the form...
AbstractContinuing the earlier research from [T. Bigorajska, H. Kotlarski, Partitioning α-large sets...
AbstractThe general question, “When is the product of Fréchet spaces Fréchet?” really depends on the...
We look for partition theorems for large subtrees for suitable uncountable trees and colourings. We ...
summary:We study cardinal coefficients related to combinatorial properties of partitions of $\omega$...
We look for partition theorems for large subtrees for suitable uncountable trees and colourings. We ...
summary:We study cardinal coefficients related to combinatorial properties of partitions of $\omega$...
AbstractTo every infinite sequence of positive integers m→={mi:i∈ω}, we associate two fields of sets...
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