The essentially chief series of a compactly generated locally compact group
Abstract
We first obtain finiteness properties for the collection of closed normal subgroups of a compactly generated locally compact group. Via these properties, every compactly generated locally compact group admits an essentially chief series - i.e. a finite normal series in which each factor is compact, discrete, or a topological chief factor. Additionally, a Jordan-H\"older theorem holds for the `large' factors in an essentially chief series.
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