Baire-class colorings: the first three levels
Abstract
The G0-dichotomy due to Kechris, Solecki and Todor\'c characterizes the analytic relations having a Borel-measurable countable coloring. We give a version of the G0-dichotomy for -measurable countable colorings when ≤ 3. A -measurable countable coloring gives a covering of the diagonal consisting of countably many squares. This leads to the study of countable unions of rectangles. We also give a Hurewicz-like dichotomy for such countable unions when ≤ 2.
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