Let Ω C RN be an open bounded connected set. We consider the eigenvalue problem -Δu = λρu in Ω with Dirichlet boundary condition, where ρ is an arbitrary function that assumes only two given values 0 < α < β and is subject to the constraint ∫ Ω ρ dx = αγ + β(|Ω| - γ) for a fixed 0 < γ < |Ω|. Cox and McLaughlin studied the optimization of the map ρ → λκ(ρ), where λκ is the kth eigenvalue. In this paper we focus our attention on the case when N ≥ 2, k = 2 and Ω is a ball. We show that, under suitable conditions on α, β and γ, the minimizers do not inherit radial symmetry.
Symmetry breaking in the minimization of the second eigenvalue for composite membranes
ANEDDA, CLAUDIA;CUCCU, FABRIZIO
2015-01-01
Abstract
Let Ω C RN be an open bounded connected set. We consider the eigenvalue problem -Δu = λρu in Ω with Dirichlet boundary condition, where ρ is an arbitrary function that assumes only two given values 0 < α < β and is subject to the constraint ∫ Ω ρ dx = αγ + β(|Ω| - γ) for a fixed 0 < γ < |Ω|. Cox and McLaughlin studied the optimization of the map ρ → λκ(ρ), where λκ is the kth eigenvalue. In this paper we focus our attention on the case when N ≥ 2, k = 2 and Ω is a ball. We show that, under suitable conditions on α, β and γ, the minimizers do not inherit radial symmetry.
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