Two disks maximize the third Robin eigenvalue: positive parameters

Abstract

The third eigenvalue of the Robin Laplacian on a simply-connected planar domain of given area is bounded above by the corresponding eigenvalue of a disjoint union of two equal disks, for Robin parameters in [-4π,4π]. This sharp inequality was known previously only for negative parameters in [-4π,0], by Girouard and Laugesen. Their proof fails for positive Robin parameters because the second eigenfunction on a disk has non-monotonic radial part. This difficulty is overcome for parameters in (0,4π] by means of a degree-theoretic approach suggested by Karpukhin and Stern that yields suitably orthogonal trial functions.