Convex sets evolving by volume-preserving fractional mean curvature flows

Eleonora Cinti; Carlo Sinestrari; Enrico Valdinoci

doi:10.2140/apde.2020.13.2149

Abstract

We consider the volume-preserving geometric evolution of the boundary of a set under fractional mean curvature. We show that smooth convex solutions maintain their fractional curvatures bounded for all times, and the long-time asymptotics approach round spheres. The proofs are based on a priori estimates on the inner and outer radii of the solutions.

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Eleonora Cinti. Carlo Sinestrari. Enrico Valdinoci. "Convex sets evolving by volume-preserving fractional mean curvature flows." Anal. PDE 13 (7) 2149 - 2171, 2020. https://doi.org/10.2140/apde.2020.13.2149

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Received: 21 November 2018; Revised: 19 July 2019; Accepted: 6 September 2019; Published: 2020

First available in Project Euclid: 19 November 2020

MathSciNet: MR4175821

Digital Object Identifier: 10.2140/apde.2020.13.2149

Subjects:

Primary: 35B40 , 35R11 , 53C44

Keywords: asymptotic behavior of solutions , fractional mean curvature flow , fractional partial differential equations , fractional perimeter , geometric evolution equations

Abstract

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