The continuous oriented chromatic number of directed Schreier graphs of Z2-shift actions
Abstract
Let \( F(2 Z2)\) be the directed Schreier graph on the free part of the Bernoulli shift \( Z2 2 Z2\), with arcs in the two coordinate directions. We prove that the continuous oriented chromatic number of it is 7, that is, there is a tournament on 7 vertices receiving a continuous graph homomorphism from F(2 Z2) and there is no continuous graph homomorphism from F(2 Z2) to any tournament on 6 vertices.
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