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An isoperimetric inequality for Laplace eigenvalues on the sphere

Mikhail Karpukhin, Nikolaï Nadirashvili, Alexei V. Penskoi, Iosif Polterovich

2021Journal of Differential Geometry25 citationsDOIOpen Access PDF

Abstract

We show that for any positive integer $k$, the $k$‑th nonzero eigenvalue of the Laplace–Beltrami operator on the two-dimensional sphere endowed with a Riemannian metric of unit area, is maximized in the limit by a sequence of metrics converging to a union of $k$ touching identical round spheres. This proves a conjecture posed by the second author in 2002 and yields a sharp isoperimetric inequality for all nonzero eigenvalues of the Laplacian on a sphere. Earlier, the result was known only for $k = 1$ (J. Hersch, 1970), $k = 2$ (N. Nadirashvili, 2002; R. Petrides, 2014) and $k = 3$ (N. Nadirashvili and Y. Sire, 2017). In particular, we argue that for any $k \geqslant 2$, the supremum of the $k$‑th nonzero eigenvalue on a sphere of unit area is not attained in the class of Riemannian metrics which are smooth outside a finite set of conical singularities. The proof uses certain properties of harmonic maps between spheres, the key new ingredient being a bound on the harmonic degree of a harmonic map into a sphere obtained by N. Ejiri.

Topics & Concepts

Isoperimetric inequalityMathematicsLaplace operatorUnit sphereInfimum and supremumRiemannian manifoldMathematical analysisCombinatoricsConjectureEigenvalues and eigenvectorsManifold (fluid mechanics)Limit (mathematics)Pure mathematicsPhysicsQuantum mechanicsMechanical engineeringEngineeringAdvanced Mathematical Modeling in EngineeringNonlinear Partial Differential EquationsGeometric Analysis and Curvature Flows