Geodesic
Extensions of infinite partition regular systems
Neil Hindman1 ; Imre Leader2 ; Dona Strauss3
1Howard University
2Centre for Mathematical Sciences, Cambridge
3University of Leeds
The electronic journal of combinatorics, Tome 22 (2015) no. 2
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A finite or infinite matrix $A$ with rational entries (and only finitely many non-zero entries in each row) is called image partition regular if, whenever the natural numbers are finitely coloured, there is a vector $x$, with entries in the natural numbers, such that $Ax$ is monochromatic. Many of the classicial results of Ramsey theory are naturally stated in terms of image partition regularity.Our aim in this paper is to investigate maximality questions for image partition regular matrices. When is it possible to add rows on to $A$ and remain image partition regular? When can one add rows but `nothing new is produced'? What about adding rows and also new variables? We prove some results about extensions of the most interesting infinite systems, and make several conjectures.Our most surprising positive result is a compatibility result for Milliken-Taylor systems, stating that (in many cases) one may adjoin one Milliken-Taylor system to a translate of another and remain image partition regular. This is in contrast to earlier results, which had suggested a strong inconsistency between different Milliken-Taylor systems. Our main tools for this are some algebraic properties of $\beta {\mathbb N}$, the Stone-Čech compactification of the natural numbers.
DOI : 10.37236/4568
Classification : 05D10
Mots-clés : image partition regular, Ramsey theory

Neil Hindman  1   ; Imre Leader  2   ; Dona Strauss  3

1 Howard University
2 Centre for Mathematical Sciences, Cambridge
3 University of Leeds 
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Neil Hindman; Imre Leader; Dona Strauss. Extensions of infinite partition regular systems. The electronic journal of combinatorics, Tome 22 (2015) no. 2. doi: 10.37236/4568

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