Optimal bounds on the fundamental spectral gap with single-well potentials

Abstract

We characterize the potential-energy functions V(x) that minimize the gap between the two lowest Sturm-Liouville eigenvalues for \[ H(p,V) u := -ddx (p(x)dudx)+V(x) u = λ u, x∈ [0,π ], \] where separated self-adjoint boundary conditions are imposed at end points, and V is subject to various assumptions, especially convexity or having a "single-well" form. In the classic case where p=1 we recover with different arguments the result of Lavine that is uniquely minimized among convex V by the constant, and in the case of single-well potentials, with no restrictions on the position of the minimum, we obtain a new, sharp bound, that > 2.04575….