Selective and Ramsey ultrafilters on G-spaces

Abstract

Let G be a group, X be an infinite transitive G-space. A free ultrafilter on X is called G-selective if, for any G-invariant partition of X, either one cell of is a member of , or there is a member of which meets each cell of in at most one point. We show (Theorem 1) that in ZFC with no additional set-theoretical assumptions there exists a G-selective ultrafilter on X, describe all G-spaces X (Theorem 2) such that each free ultrafilter on X is G-selective, and prove (Theorem 3) that a free ultrafilter on ω is selective if and only if is G-selective with respect to the action of any countable group G of permutations of ω. A free ultrafilter on X is called G-Ramsey if, for any G-invariant coloring :[G]2 \0,1\, there is U∈ such that [U]2 is -monochrome. By Theorem 4, each G-Ramsey ultrafilter on X is G-selective. Theorems 5 and 6 give us a plenty of Z-selective ultrafilters on Z (as a regular Z-space) but not Z-Ramsey. We conjecture that each Z-Ramsey ultrafilter is selective.