Subgroup Distortion and the Relative Dehn Functions of Metabelian Groups
Abstract
We show the connection between the relative Dehn function of a finitely generated metabelian group and the distortion function of a corresponding subgroup in the wreath product of two free abelian groups of finite rank. Further, we show that if a finitely generated metabelian group G is an extension of an abelian group by Z the relative Dehn function of G is polynomially bounded. Therefore, if G is finitely presented, the Dehn function is bounded above by the exponential function up to equivalence.
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