Freiheitssatz

In mathematics, the Freiheitssatz (German: "freedom/independence theorem": Freiheit + Satz) is a result in the presentation theory of groups, stating that certain subgroups of a one-relator group are free groups.

Consider a group presentation

${\displaystyle G=⟨x_1,\dots ,x_n|r=1⟩}$

given by Template:Mvar generators Template:Math and a single cyclically reduced relator Template:Mvar. If Template:Math appears in Template:Mvar, then (according to the freiheitssatz) the subgroup of Template:Mvar generated by Template:Math is a free group, freely generated by Template:Math. In other words, the only relations involving Template:Math are the trivial ones.

The result was proposed by the German mathematician Max Dehn and proved by his student, Wilhelm Magnus, in his doctoral thesis.^[1] Although Dehn expected Magnus to find a topological proof,^[2] Magnus instead found a proof based on mathematical induction^[3] and amalgamated products of groups.^[4] Different induction-based proofs were given later by Template:Harvtxt and Template:Harvtxt.^[3][5][6]

The freiheitssatz has become "the cornerstone of one-relator group theory", and motivated the development of the theory of amalgamated products. It also provides an analogue, in non-commutative group theory, of certain results on vector spaces and other commutative groups.^[4]

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