Every CBER is smooth below the Carlson-Simpson generic partition
Abstract
Let E be a countable Borel equivalence relation on the space E∞ of all infinite partitions of the natural numbers. We show that E coincides with equality below a Carlson-Simpson generic element of E∞. In contrast, we show that there is a hypersmooth equivalence relation on E∞ which is Borel bireducible with E1 on every Carlson-Simpson cube. Our arguments are classical and require no background in forcing.
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