Duality for image and kernel partition regularity of infinite matrices

Abstract

A matrix A is image partition regular over Q provided that whenever Q - 0 is finitely coloured, there is a vector x with entries in Q - 0 such that the entries of Ax are monochromatic. It is kernel partition regular over Q provided that whenever Q - 0 is finitely coloured, the matrix has a monochromatic member of its kernel. We establish a duality for these notions valid for both finite and infinite matrices. We also investigate the extent to which this duality holds for matrices partition regular over proper subsemigroups of Q.