Mycielski among trees

Abstract

Two-dimensional version of the classical Mycielski theorem says that for every comeager or conull set X⊂eq [0,1]2 there exists a perfect set P⊂eq [0,1] such that P× P⊂eq X . We consider generalizations of this theorem by replacing a perfect square with a rectangle A× B, where A and B are bodies of other types of trees with A⊂eq B. In particular, we show that for every comeager Gδ set G⊂eq ωω× ωω there exist a Miller tree M and a uniformly perfect tree P⊂eq M such that [P]× [M]⊂eq G and that P cannot be a Miller tree. In the case of measure we show that for every subset F of 2ω× 2ω of full measure there exists a uniformly perfect tree P⊂eq 2<ω such that [P]×[P]⊂eq F and no side of such a rectangle can be a body of a Silver tree or a Miller tree. We also show some properties of forcing extensions of the real line from which we derive nonstandard proofs of Mycielski-like theorems via Shoenfield Absoluteness Theorem.