Partitions of Minimal Length on Manifolds

Beniamin Bogosel; Édouard Oudet

doi:10.1080/10586458.2016.1223570

Partitions of Minimal Length on Manifolds

Beniamin Bogosel
, Édouard Oudet

LTHE (UMR 5564 CNRS/IRD/Université de Grenoble)

Research output: Contribution to journal › Article › peer-review

Abstract

We study partitions on three-dimensional manifolds which minimize the total geodesic perimeter. We propose a relaxed framework based on a Γ-convergence result and we show some numerical results. We compare our results to those already present in the literature in the case of the sphere. For general surfaces we provide an optimization algorithm on meshes which can give a good approximation of the optimal cost, starting from the results obtained using the relaxed formulation.

Original language	English
Pages (from-to)	496-508
Number of pages	13
Journal	Experimental Mathematics
Volume	26
Issue number	4
DOIs	https://doi.org/10.1080/10586458.2016.1223570
Publication status	Published - 2 Oct 2017
Externally published	Yes

Keywords

gamma convergence
numerical simulations
optimal partitions
perimeter

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10.1080/10586458.2016.1223570

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abstract = "We study partitions on three-dimensional manifolds which minimize the total geodesic perimeter. We propose a relaxed framework based on a Γ-convergence result and we show some numerical results. We compare our results to those already present in the literature in the case of the sphere. For general surfaces we provide an optimization algorithm on meshes which can give a good approximation of the optimal cost, starting from the results obtained using the relaxed formulation.",

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AB - We study partitions on three-dimensional manifolds which minimize the total geodesic perimeter. We propose a relaxed framework based on a Γ-convergence result and we show some numerical results. We compare our results to those already present in the literature in the case of the sphere. For general surfaces we provide an optimization algorithm on meshes which can give a good approximation of the optimal cost, starting from the results obtained using the relaxed formulation.

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KW - numerical simulations

KW - optimal partitions

KW - perimeter

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Partitions of Minimal Length on Manifolds

Abstract

Keywords

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