A rearrangement minimization problem corresponding to p -Laplacian equation

Chiu-Yen Kao (Lead / Corresponding author), S.A. Mohammadi

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1 Citation (Scopus)
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Abstract

In this paper a rearrangement minimization problem corresponding to solutions of the p-Laplacian equation is considered. The solution of the minimization problem determines the optimal way of exerting external forces on a membrane in order to have a minimum displacement. Geometrical and topological properties of the optimizer is derived and the analytical solution of the problem is obtained for circular and annular membranes. Then, we find nearly optimal solutions which are shown to be good approximations to the minimizer for specific ranges of the parameter values in the optimization problem. A robust and efficient numerical algorithm is developed based upon rearrangement techniques to derive the solution of the minimization problem for domains with different geometries in ℝ2 and ℝ3.
Original languageEnglish
Article number11
Number of pages20
JournalESAIM: Control, Optimisation and Calculus of Variations
Volume11
Early online date14 Feb 2022
DOIs
Publication statusPublished - 2022

Keywords

  • p-Laplacian
  • rearrangement minimization
  • analytical solution
  • rearrangement algorithms
  • membranes

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