Lipschitz Embeddings of Metric Spaces into c0
Abstract
Let M be a separable metric space. We say that f=(fn):M c0 is a good-λ-embedding if, whenever x,y∈ M, x y implies d(x,y) f(x)-f(y) and, for each n, Lip(fn)<λ, where Lip(fn) denotes the Lipschitz constant of fn. We prove that there exists a good-λ-embedding from M into c0 if and only if M satisfies an internal property called π(λ). As a consequence, we obtain that for any separable metric space M, there exists a good-2-embedding from M into c0. These statements slightly extend former results obtained by N. Kalton and G. Lancien, with simplified proofs.
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