Absorption of Direct Factors With Respect to the Minimal Faithful Permutation Degree of a Finite Group
Abstract
The minimal faithful permutation degree μ(G) of a finite group G is the least nonnegative integer n such that G embeds in the symmetric group (n). We prove that if H is a group then μ(G)=μ(G× H) for some group G then H embeds in A× Qk for some abelian group of odd order, some generalised quaternion 2-group and some nonnegative integer k. As a consequence, μ(Gn+1)=μ(Gn) for some nonnegative integer n if and only if G is trivial.
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