Second Robin eigenvalue bounds for Schr\"odinger operators on Riemannian surfaces

Abstract

Let (2,ds2) be a compact Riemannian surface, possibly with boundary, and consider Schr\"odinger-type operators of the form L=+V-aK together with natural Robin and Steklov-type boundary conditions incorporating a boundary potential W and (in the curvature-corrected setting) the geodesic curvature g of ∂. Our main contribution is a geometric upper bound for the second Robin eigenvalue in terms of the topology of and the integrals of V and W, obtained via a Hersch balancing argument on the capped surface. As a geometric application, we derive sharp topological restrictions for compact two-sided free boundary minimal surfaces of Morse index at most one inside geodesic balls of negatively curved pinched Cartan--Hadamard 3-manifolds under a mild radius condition. We also prove complementary upper bounds for first eigenvalues in the closed and Robin settings, including rigidity in the curvature-corrected case, and we establish Steklov-type estimates in a coercive regime where the Dirichlet-to-Neumann operator is well defined for all boundary data.