On embeddings of locally finite metric spaces into $\ell_p$

Abstract: It is known that if finite subsets of a locally finite metric space $M$ admit $C$-bilipschitz embeddings into $\ell_p$ $(1\le p\le \infty)$, then for every $\epsilon>0$, the space $M$ admits a $(C+\epsilon)$-bilipschitz embedding into $\ell_p$. The goal of this paper is to show that for $p\ne 2,\infty$ this result is sharp in the sense that $\epsilon$ cannot be dropped out of its statement.