On the weak Borel chromatic number and cardinal invariants of the continuum
Abstract
We prove that consistently, cov(M)< λ0 < λ1 < λ∞ < 20, where λ0 denotes the weak Borel chromatic number of the Kechris-Solecki-Todorcevi\'c graph G0, that is, the minimal cardinality of a G0-independent Borel covering of 2ω, while λ1 and λ∞ are the corresponding invariants of the graph G1 and the simple graph associated with the equivalence relation E0.
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