Non-Jordaness of the automorphism group of the zero-divisor graph of a matrix ring over number rings

Published 13 Mar 2024 in math.CO | (2403.08349v2)

Abstract: We provide a construction of the induced subgraphs of the zero-divisor graph of $M_2(R)$ for the ring $R$ of algebraic integers of some number fields that are neither complete nor connected, and study the structure of the induced subgraphs explicitly. As an application, we prove that the automorphism group of the zero-divisor graph of $M_2(R)$ is not a Jordan group.

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