On deterministic solutions for multi-marginal optimal transport with Coulomb cost
Bindini, U., De Pascale, L., & Kausamo, A. (2022). On deterministic solutions for multi-marginal optimal transport with Coulomb cost. Communications on Pure and Applied Analysis, 21(4), 1189-1208. https://doi.org/10.3934/cpaa.2022015
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Communications on Pure and Applied AnalysisDate
2022Copyright
© 2021 American Institute of Mathematical Sciences
In this paper we study the three-marginal optimal mass transportation problem for the Coulomb cost on the plane R2. The key question is the optimality of the so-called Seidl map, first disproved by Colombo and Stra. We generalize the partial positive result obtained by Colombo and Stra and give a necessary and sufficient condition for the radial Coulomb cost to coincide with a much simpler cost that corresponds to the situation where all three particles are aligned. Moreover, we produce an infinite class of regular counterexamples to the optimality of this family of maps.
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American Institute of Mathematical Sciences (AIMS)ISSN Search the Publication Forum
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The second and third authors are partially supported by the project:Alcuni problemi di trasporto ottimo ed applicazioni of GNAMPA-INDAM, the second author is partially supported by Fondi di Ateneo of the University of Firenze, the third author was partially supported by the project Contemporary topics on multi-marginal optimal mass transportation, funded by the Finnish Postdoctoral Pool (Suomen Kulttuurisäätiö). ...License
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