English

Rearrangement inequalities and applications to isoperimetric problems for eigenvalues

Analysis of PDEs 2007-05-23 v1

Abstract

Let Ω\Omega be a bounded C2C^{2} domain in Rn\R^n, and let Ω\Omega^{\ast} be the Euclidean ball centered at 0 and having the same Lebesgue measure as Ω\Omega. Consider the operator L=÷(A)+v+VL=-\div(A\nabla)+v\cdot \nabla +V on Ω\Omega with Dirichlet boundary condition. We prove that minimizing the principal eigenvalue of LL when the Lebesgue measure of Ω\Omega is fixed and when AA, vv and VV vary under some constraints is the same as minimizing the principal eigenvalue of some operators LL^* in the ball Ω\Omega^* with smooth and radially symmetric coefficients. The constraints which are satisfied by the original coefficients in Ω\Omega and the new ones in Ω\Omega^* are expressed in terms of some distribution functions or some integral, pointwise or geometric quantities. Some strict comparisons are also established when Ω\Omega is not a ball.

Keywords

Cite

@article{arxiv.math/0608136,
  title  = {Rearrangement inequalities and applications to isoperimetric problems for eigenvalues},
  author = {Francois Hamel and Nikolai Nadirashvili and Emmanuel Russ},
  journal= {arXiv preprint arXiv:math/0608136},
  year   = {2007}
}