A note on the chromatic number of Kneser graphs on chambers of projective planes and incidence-free sets

Abstract

Let D=(P,B) be a symmetric (v,k,λ)-design and let (X,Y) be an equinumerous incidence-free pair, with X⊂eq P and Y⊂eq B. In this note, we give an elementary proof which shows the existence of a perfect matching between P X and B Y in the incidence graph of D. This recovers a result of Spiro, Adriaensen and Mattheus, who already showed this using different arguments for k≥ 36. We use this to connect some dots in the literature and prove that finding the chromatic number of the Kneser graph on chambers of a projective plane is equivalent to finding the incidence-free number of the incidence graph of the plane.