The Weisfeiler-Leman algorithm and the diameter of Schreier graphs
Abstract
We prove that the number of iterations taken by the Weisfeiler-Leman algorithm for configurations coming from Schreier graphs is closely linked to the diameter of the graphs themselves: an upper bound is found for general Schreier graphs, and a lower bound holds for particular cases, such as for Schreier graphs with G=SLn( Fq) (q>2) acting on k-tuples of vectors in Fqn; moreover, an exact expression is found in the case of Cayley graphs.
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