Improved bounds on the size of the smallest representation of relation algebra 3265

Abstract

In this paper, we shed new light on the spectrum of the relation algebra we call An, which is obtained by splitting the non-flexible diversity atom of 67 into n symmetric atoms. Precisely, we show that the minimum value in Spec(An) is at most 2n6 + o(1), which is the first polynomial bound and improves upon the previous bound due to Dodd \& Hirsch (J. Relational Methods in Computer Science 2013). We also improve the lower bound to 2n2 + 4n + 1, which is asymptotically double the trivial bound of n2 + 2n + 3. In the process, we obtain stronger results regarding Spec(A2) =Spec(3265). Namely, we show that 1024 is in the spectrum, and no number smaller than 26 is in the spectrum. Our improved lower bounds were obtained by employing a SAT solver, which suggests that such tools may be more generally useful in obtaining representation results.