Comer Schemes, Relation Algebras, and the Flexible Atom Conjecture

Abstract

In this paper, we consider relational structures arising from Comer's finite field construction, where the cosets need not be sum free. These Comer schemes generalize the notion of a Ramsey scheme and may be of independent interest. As an application, we give the first finite representation of 3465. This leaves 3365 as the only remaining relation algebra in the family N65 with a flexible atom that is not known to be finitely representable. Motivated by this, we complement our upper bounds with some lower bounds. Using a SAT solver, we show that 3365 is not finitely representable on fewer than 24 points, and that 3365 does not admit a cyclic group representation on fewer than 120 points. We also employ a SAT solver to show that 3465 is not representable on fewer than 24 points.