Finite groups with quadratic splitting fields for all Cayley graphs

Abstract

For a graph Γ, the splitting field of Γ is defined as the splitting field of the characteristic polynomial of Γ over rationals. The algebraic degree of Γ is defined by the extension degree of its splitting field over rationals. Let k be a positive integer. We call a finite group G Cayley k-integral if, for every inverse-closed subset S of G, the algebraic degree of the Cayley graph (G,S) does not exceed k. We give a complete classification of all finite Cayley 2-integral groups. It is shown that a finite abelian group is Cayley 2-integral if and only if it is isomorphic to one of the following forms: G Z2r × Z5s, Z2r × Z4s × Z8t, or Z2r × Z3s × Z12t, where r, s, t ≥ 0. Furthermore, we prove that the set of finite non-abelian Cayley 2-integral groups consists of the infinite family Q8 × Z2n, with n ≥ 0, and 22 specific groups.

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