On WL-rank and WL-dimension of some Deza circulant graphs

Abstract

The WL-rank of a digraph is defined to be the rank of the coherent configuration of . The WL-dimension of is defined to be the smallest positive integer m for which is identified by the m-dimensional Weisfeiler-Leman algorithm. We classify the Deza circulant graphs of WL-rank 4. In additional, it is proved that each of these graphs has WL-dimension at most 3. Finally, we establish that some families of Deza circulant graphs have WL-rank 5 or 6 and WL-dimension at most 3.