An asymmetric random Rado theorem for single equations: the 0-statement

Abstract

A famous result of Rado characterises those integer matrices A which are partition regular, i.e. for which any finite colouring of the positive integers gives rise to a monochromatic solution to the equation Ax=0. Aigner-Horev and Person recently stated a conjecture on the probability threshold for the binomial random set [n]p having the asymmetric random Rado property: given partition regular matrices A1, …, Ar (for a fixed r ≥ 2), however one r-colours [n]p, there is always a colour i ∈ [r] such that there is an i-coloured solution to Ai x=0. This generalises the symmetric case, which was resolved by R\"odl and Ruci\'nski, and Friedgut, R\"odl and Schacht. Aigner-Horev and Person proved the 1-statement of their asymmetric conjecture. In this paper, we resolve the 0-statement in the case where the Ai x=0 correspond to single linear equations. Additionally we close a gap in the original proof of the 0-statement of the (symmetric) random Rado theorem.