Zassenhaus lemma Guide, Meaning , Facts, Information and Description

In mathematics, the butterfly lemma or Zassenhaus lemma is a technical result on the lattice of subgroups of a group.

First, a definition. A group, , is an -group if and only if there exists a set map

,

where is the category of groups and is the set of group endomorphisms of .

Lemma (Butterfly lemma): Say is an -group and and are subgroups. Suppose

and  are -subgroups. Then,

is isomorphic to

Hans Julius Zassenhaus proved this lemma specifically to give the smoothest proof of the Schreier refinement theorem. The 'butterfly' becomes apparent when trying to draw the Hasse diagram of the various groups involved.

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