Proof of spherical flocking based on quantitative rearrangement inequalities

Autor:	Elliott H. Lieb, Rupert L. Frank
Jazyk:	angličtina
Rok vydání:	2021
Předmět:	Characteristic function (convex analysis) 021103 operations research 010102 general mathematics Mathematical analysis Work (physics) 0211 other engineering and technologies 02 engineering and technology 01 natural sciences Theoretical Computer Science Functional Analysis (math.FA) Set (abstract data type) Mathematics - Functional Analysis Mathematics (miscellaneous) Mathematics - Analysis of PDEs Mathematics - Classical Analysis and ODEs Classical Analysis and ODEs (math.CA) FOS: Mathematics Rearrangement inequality Ball (mathematics) 0101 mathematics Mathematical structure Ground state Flocking (texture) Mathematics Analysis of PDEs (math.AP)
Popis:	Our recent work on the Burchard-Choksi-Topaloglu flocking problem showed that in the large mass regime the ground state density profile is the characteristic function of some set. Here we show that this set is, in fact, a round ball. The essential mathematical structure needed in our proof is a strict rearrangement inequality with a quantitative error estimate, which we deduce from recent deep results of M. Christ. Comment: 20 pages
Databáze:	OpenAIRE
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