On algebraic sums, trees and ideals in the Cantor space

Abstract

We work in the Cantor space 2ω. The results of the paper adhere the following pattern. Let I∈ \M, N, M N, E\ and T be a perfect, uniformly perfect or Silver tree. Then for every A∈ I there exists T'⊂eq T of the same kind as T such that A+[T']+[T']+… +[T']n--times∈ I for each n∈ω. We also prove weaker statements for splitting trees. For the case E we also provide a simple characterization of basis of E. We use these results to prove that the algebraic sum of a generalized Luzin set and a generalized Sierpi\'nski set belongs to u0 and v0, provided that c is a regular cardinal.

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