On the Lp-distorsion of finite quotients of amenable groups
Abstract
We study the Lp-distortion of finite quotients of amenable groups. In particular, for every number p larger or equal than 2, we prove that the lp-distortion of the finite lamplighter group grows like ( n)1/p. We also give the asymptotic behavior of the lp-distortion of finite quotients of certain metabelian polycyclic groups and of the solvable Baumslag-Solitar groups BS(m,1). The proofs are short and elementary.
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