In this paper we prove the existence of an optimal set for the minimization of the (Formula presented.) th variational eigenvalue of the (Formula presented.) -Laplacian among (Formula presented.) -quasi open sets of fixed measure included in a box of finite measure. An analogous existence result is obtained for eigenvalues of the (Formula presented.) -Laplacian associated with Schrödinger potentials. In order to deal with these nonlinear shape optimization problems, we develop a general approach which allows to treat the continuous dependence of the eigenvalues of the (Formula presented.) -Laplacian associated with sign-changing capacitary measures under (Formula presented.) -convergence.
Degiovanni, M., Mazzoleni, D., Optimization results for the higher eigenvalues of the p-Laplacian associated with sign-changing capacitary measures, <<JOURNAL OF THE LONDON MATHEMATICAL SOCIETY>>, 2021; 104 (1): 97-146. [doi:10.1112/jlms.12425] [http://hdl.handle.net/10807/182902]
Optimization results for the higher eigenvalues of the p-Laplacian associated with sign-changing capacitary measures
Degiovanni, M.Primo
;Mazzoleni, D.
Secondo
2021
Abstract
In this paper we prove the existence of an optimal set for the minimization of the (Formula presented.) th variational eigenvalue of the (Formula presented.) -Laplacian among (Formula presented.) -quasi open sets of fixed measure included in a box of finite measure. An analogous existence result is obtained for eigenvalues of the (Formula presented.) -Laplacian associated with Schrödinger potentials. In order to deal with these nonlinear shape optimization problems, we develop a general approach which allows to treat the continuous dependence of the eigenvalues of the (Formula presented.) -Laplacian associated with sign-changing capacitary measures under (Formula presented.) -convergence.
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