Off-diagonal Rado number for x+y+c=z and x+qy=z

Abstract

Ramsey-type problems for linear equations began with Schur's theorem and were systematically generalized by Richard Rado. In the off-diagonal framework for two colors, one considers two different linear equations (E1,E2) and determines the minimum integer N for which any red-blue coloring of \1,2,...,N\ forces either a red solution of the equation E1 or a blue solution of the equation E2. In this work, we study off-diagonal Rado numbers for non-homogeneous linear equations of the forms x+y+c=z and x+qy=z. We determine the exact two-color off-diagonal Rado number R2(c,q) associated with this system of equations.