Planar Earthmover is not in L_1
Assaf Naor; Gideon Schechtman;
Planar Earthmover is not in L_1
We show that any $L_1$ embedding of the transportation cost (a.k.a. Earthmover) metric on probability measures supported on the grid $\{0,1,...,n\}^2\subseteq \R^2$ incurs distortion $Ω(\sqrt{\log n})$. We also use Fourier analytic techniques to construct a simple $L_1$ embedding of this space which has distortion $O(\log n)$.
- Microsoft (United Kingdom) United Kingdom
- Weizmann Institute of Science Israel
- Microsoft Research
- Microsoft (United States) United States
- Microsoft Research (India) India
Mathematics - Functional Analysis, Computational Geometry (cs.CG), FOS: Computer and information sciences, FOS: Mathematics, Computer Science - Computational Geometry, Functional Analysis (math.FA)
Mathematics - Functional Analysis, Computational Geometry (cs.CG), FOS: Computer and information sciences, FOS: Mathematics, Computer Science - Computational Geometry, Functional Analysis (math.FA)
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