On the isometrisability of group actions on p-spaces
Abstract
In this note we consider a p-isometrisability property of discrete groups. If p=2 this property is equivalent to unitarisability. We prove that any group containing a non-abelian free subgroup is not p-isometrisable for any p∈ (1, ∞). We also discuss some open questions and possible relations of p-isometrisability with the recently introduced Littlewood exponent Lit().
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