On uniform and coarse rigidity of Lp([0,1])
Abstract
If X is an almost transitive Banach space with amenable isometry group (for example, if X=Lp([0,1]) with 1≤slant p<∞) and X admits a uniformly continuous map Xφ E into a Banach space E satisfying ∈f\|x-y\|=r \| φ(x)-φ(y)\|>0 for some r>0, then X admits a simultaneously uniform and coarse embedding into a Banach space V that is finitely representable in L2(E).
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