Schreier refinement theorem

E621109

The Schreier refinement theorem is a result in group theory stating that any two subnormal series of a group admit equivalent refinements, serving as a precursor and companion to the Jordan–Hölder theorem.

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Schreier refinement theorem canonical 1

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Statements (29)

Predicate Object
instanceOf theorem
appliesTo finite groups
infinite groups
subnormal series of a group
concerns composition series
factor groups
groups
refinement of series
subnormal series
field group theory
hasConcept equivalent refinements
isomorphic factor groups
refinement of a series of subgroups
hasConsequence any two composition series of a group are equivalent (together with additional arguments)
implies any two subnormal series of a group have refinements with isomorphic factor groups up to order
isCompanionOf Jordan–Hölder theorem NERFINISHED
isPrecursorOf Jordan–Hölder theorem NERFINISHED
namedAfter Otto Schreier NERFINISHED
refines Jordan–Hölder theorem NERFINISHED
requires definition of factor group
definition of normal subgroup
definition of subnormal subgroup
statement Any two subnormal series of a group admit equivalent refinements.
topic equivalence of series
series of subgroups
structure of groups
usedIn abstract algebra textbooks
classification of series of subgroups
proofs of Jordan–Hölder theorem

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Jordan–Hölder theorem relatedTo Schreier refinement theorem