Projective Chromatic Numbers
Abstract
We extend classical notions of definable colourability of graphs to the general projective setting and investigate whether known results, mainly about the G0 dichotomy and the 2n + 1 conjecture, hold in the context of higher projective pointclasses. We establish that for n 2, the presence of a 1n-definable well-order of the reals implies 1n(G) = (G) for all locally countable 1n-definable graphs G, and that the presence of a 12-definable well-order of the reals implies 12(G) = (G) for all locally countable Borel graphs G.
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