Canonization of smooth equivalence relations on infinite-dimensional perfect cubes
Abstract
A canonization scheme for smooth equivalence relations on Rω modulo restriction to infinite perfect products is proposed. It shows that given a pair of Borel smooth equivalence relations E, F on Rω, there is an infinite perfect product P⊂eq Rω such that either F⊂eq E on P, or, for some j<ω, the following is true for all x,y∈ P: x\, E \,y implies x(j)=y(j), and x(ω\j\)=y(ω\j\) implies x\, F \,y.
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