Add to ORKGWe study the Borel versions of Uniformly Completely Ramsey null sets. We give general theorems on game-defined classes of sigma-ideals.
We classify the Borel ideals I on the set of natural numbers N for which p(N)/I can be Borel embedde...
We prove a general theorem indicating that essentially all infinite-dimensional Ramsey-type theorems...
We classify the Borel ideals I on the set of natural numbers N for which p(N)/I can be Borel embedde...
We collect some properties of uniformly completely Ramsey null sets (for example, every hereditary M...
Galvin and Prikry defined completely Ramsey sets and showed that the class of completely Ramsey sets...
Galvin and Prikry defined completely Ramsey sets and showed that the class of completely Ramsey sets...
The ideals of Borel sets on the unit interval, closed under countable unions and invariant under tra...
The ideals of Borel sets on the unit interval, closed under countable unions and invariant under tra...
Ramsey theory studies the internal homogenity of mathematical structures (graphs, number sets), part...
Ramsey theory studies the internal homogenity of mathematical structures (graphs, number sets), part...
Jordan [2006] defined ‘pillage games’, a class of cooperative games whose dominance operator represe...
AbstractIt is easy to see that the infinite homogeneous set A in Ramsey's theorem may be arbitrarily...
Ramsey theory studies the internal homogenity of mathematical structures (graphs, number sets), part...
The Ramsey problem is considered for various classes of (universal) algebras. It is shown that every...
Ramsey theory studies the internal homogenity of mathematical structures (graphs, number sets), part...
We classify the Borel ideals I on the set of natural numbers N for which p(N)/I can be Borel embedde...
We prove a general theorem indicating that essentially all infinite-dimensional Ramsey-type theorems...
We classify the Borel ideals I on the set of natural numbers N for which p(N)/I can be Borel embedde...
We collect some properties of uniformly completely Ramsey null sets (for example, every hereditary M...
Galvin and Prikry defined completely Ramsey sets and showed that the class of completely Ramsey sets...
Galvin and Prikry defined completely Ramsey sets and showed that the class of completely Ramsey sets...
The ideals of Borel sets on the unit interval, closed under countable unions and invariant under tra...
The ideals of Borel sets on the unit interval, closed under countable unions and invariant under tra...
Ramsey theory studies the internal homogenity of mathematical structures (graphs, number sets), part...
Ramsey theory studies the internal homogenity of mathematical structures (graphs, number sets), part...
Jordan [2006] defined ‘pillage games’, a class of cooperative games whose dominance operator represe...
AbstractIt is easy to see that the infinite homogeneous set A in Ramsey's theorem may be arbitrarily...
Ramsey theory studies the internal homogenity of mathematical structures (graphs, number sets), part...
The Ramsey problem is considered for various classes of (universal) algebras. It is shown that every...
Ramsey theory studies the internal homogenity of mathematical structures (graphs, number sets), part...
We classify the Borel ideals I on the set of natural numbers N for which p(N)/I can be Borel embedde...
We prove a general theorem indicating that essentially all infinite-dimensional Ramsey-type theorems...
We classify the Borel ideals I on the set of natural numbers N for which p(N)/I can be Borel embedde...