On recurrence in G-spaces
Abstract
We introduce and analyze the following general concept of recurrence. Let G be a group and let X be a G-space with the action G× X X, (g,x) gx. For a family F of subset of X and A∈ F, we denote F(A)=\g∈ G: gB⊂eq A for some B∈ F, \ B⊂eq A\, and say that a subset R of G is F-recurrent if R F (A)≠ for each A∈ F.
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