Reductions and necessary conditions for tall Borel Ramsey ideals
Abstract
An ideal I on ω has the Ramsey property if I+(I+)22: every 2-colouring of the pairs of an I-positive set has an I-positive homogeneous subset. Whether a tall Borel ideal can have the Ramsey property is an open question of Hrušák, Meza-Alcántara, Thümmel and Uzcátegui; a coanalytic example exists in ZFC, so a negative answer must use definability essentially. Our main theorem, a synthesis of the results of the paper, states that a tall Borel Ramsey ideal admits no countable local reading. Below every positive set, such an ideal is not a countable intersection of topologically represented (or tall analytic P-) ideals, and its quotient has no countable dense subset. Moreover, every quotient name for a new real has uncountable width, the colouring witnessing non-selectivity of the generic ultrafilter is never read continuously on a positive condition, and hereditary tall subfamilies saturate every finite window of barrier dimensions coherently but never all dimensions at once. We prove separately that a weakly selective q+ ideal admits no positive EDfin-carrier. The converse question -- must Borelness force a properness-like countable reading on some positive condition? -- is stated in three precise forms with proved consequences: two of them would refute tall Borel Ramsey ideals outright, the third the strictly weaker Nash--Williams class. The main question remains open.
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