On multidimensional Schur rings of finite groups
Abstract
For any finite group G and a positive integer m, we define andstudy a Schur ring over the direct power Gm, which gives an algebraic interpretation of the partition of Gm obtained by the m-dimensional Weisfeiler-Leman algorithm. It is proved that this ring determines the group G up to isomorphism if m 3, and approaches the Schur ring associated with the group Aut(G) acting on Gm naturally if m increases. It turns out that the problem of finding this limit ring is polynomial-time equivalent to the group isomorphism problem.
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