Count-Free Weisfeiler--Leman and Group Isomorphism

Abstract

We investigate the power of counting in Group Isomorphism. We first leverage the count-free variant of the Weisfeiler--Leman Version I algorithm for groups (Brachter & Schweitzer, LICS 2020) in tandem with limited non-determinism and limited counting to improve the parallel complexity of isomorphism testing for several families of groups. These families include: - Direct products of non-Abelian simple groups. - Coprime extensions, where the normal Hall subgroup is Abelian and the complement is an O(1)-generated solvable group with solvability class poly n. This notably includes instances where the complement is an O(1)-generated nilpotent group. This problem was previously known to be in P (Qiao, Sarma, & Tang, STACS 2011), and the complexity was recently improved to L (Grochow & Levet, FCT 2023). - Graphical groups of class 2 and exponent p > 2 (Mekler, J. Symb. Log., 1981) arising from the CFI and twisted CFI graphs (Cai, F\"urer, & Immerman, Combinatorica 1992) respectively. In particular, our work improves upon previous results of Brachter & Schweitzer (LICS 2020). We finally show that the q-ary count-free pebble game is unable to distinguish even Abelian groups. This extends the result of Grochow & Levet (ibid), who established the result in the case of q = 1. The general theme is that some counting appears necessary to place Group Isomorphism into P.

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