Lower Bound For The Ratios Of Eigenvalues Of Schr\"odinger Equations With Nonpositive Single-Barrier Potentials

Abstract

Horv\'ath and Kiss [Proc. Amer. Math. Soc., 2005] proved the upper bound estimate λ nλ m≤ n2m2 (n>m≥ 1) for Dirichlet eigenvalue ratios of the Schr\"odinger problem -y''+q(x)y=λ y with nonnegative and single-well potential q. In this paper, we prove that if q(x) is a nonpositive, continuous and single-barrier potential, then λnλm≥ n2m2 for λn>λm ≥ -2q*, where q=\q(0), q(1)\. In particular, if q(x) satisfies the additional condition q ≤ π23, then λ 1>0 and λ nλ m≥ n2%m2 for n>m≥ 1. For this result, we develop a new approach to study the monotonicity of the modified Pr\"ufer angle function.