Multiply partition regular matrices

Abstract

Let A be a finite matrix with rational entries. We say that A is doubly image partition regular\/ if whenever the set N of positive integers is finitely coloured, there exists x such that the entries of A x are all the same colour (or monochromatic\/) and also, the entries of x are monochromatic. Which matrices are doubly image partition regular? More generally, we say that a pair of matrices (A,B), where A and B have the same number of rows, is doubly kernel partition regular\/ if whenever N is finitely coloured, there exist vectors x and y, each monochromatic, such that A x + B y = 0. There is an obvious sufficient condition for the pair (A,B) to be doubly kernel partition regular, namely that there exists a positive rational c such that the matrix M=(arraycccccA&cBarray) is kernel partition regular. (That is, whenever N is finitely coloured, there exists monochromatic x such that M x= 0.) Our aim in this paper is to show that this sufficient condition is also necessary. As a consequence we have that a matrix A is doubly image partition regular if and only if there is a positive rational c such that the matrix (arraylrA&cIarray) is kernel partition regular, where I is the identity matrix of the appropriate size. We also prove extensions to the case of several matrices.