Experiment. Math.
20(3):
260-270
(2011).
This article is only available to subscribers. It is not available for individual sale.
This will count as one of your downloads.
You will have access to both the presentation and article (if available).
Abstract
A numerical process to approximate optimal partitions in any dimension is reported. The key idea of the method is to relax the problem into a functional framework based on the famous result of Γ-convergence obtained by Modica and Mortolla.
Citation
Édouard Oudet. "Approximation of Partitions of Least Perimeter by Γ-Convergence: Around Kelvin’s Conjecture." Experiment. Math. 20 (3) 260 - 270, 2011.
Information
Published: 2011
First available in Project Euclid: 6 October 2011
zbMATH: 1261.49009
MathSciNet: MR2836251
Subjects:
Primary:
49Q15
,
53A10
,
65K10
Keywords:
foams
,
Kelvin’s conjecture
,
optimal tiling
,
Γ-convergence
Rights: Copyright © 2011 A K Peters, Ltd.
Édouard Oudet "Approximation of Partitions of Least Perimeter by Γ-Convergence: Around Kelvin’s Conjecture," Experimental Mathematics, Experiment. Math. 20(3), 260-270, (2011)
Include:
Format: