ABSTRACT We investigate how the lowest eigenvalue of a magnetic Laplacian depends on the geometry of a planar domain with a disk‐shaped hole, where the magnetic field is generated by a singular flux. Under Dirichlet boundary conditions on the inner boundary and Neumann boundary conditions on the outer boundary, we show that this eigenvalue is maximized when the domain is an annulus, for a fixed area and magnetic flux. As consequences, we establish geometric inequalities for eigenvalues in settings with both singular and localized magnetic fields. We also propose a conjecture for a general optimality result and establish its validity for large magnetic fluxes.
Ghosh et al. (Wed,) studied this question.
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