Components and minimal normal subgroups of finite and pseudofinite groups

Journal of Symbolic Logic 84 (1):290-300 (2019)
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Abstract

It is proved that there is a formula$\pi \left$in the first-order language of group theory such that each component and each non-abelian minimal normal subgroup of a finite groupGis definable by$\pi \left$for a suitable elementhofG; in other words, each such subgroup has the form$\left\{ {x|x\pi \left} \right\}$for someh. A number of consequences for infinite models of the theory of finite groups are described.

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10.1017/jsl.2018.71

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