Upper Bound For The Ratios Of Eigenvalues Of Schrodinger Operators With Nonnegative Single-Barrier Potentials

Abstract

In this paper we prove the optimal upper bound λnλm≤n2m2 (λn>λm≥ 11x∈[0,1]q(x)) for one-dimensional Schrodinger operators with a nonnegative differentiable and single-barrier potential q(x), such that q'(x) ≤ q*, where q*=215\q(0) , q(1)\. In particular, if q(x) satisfies the additional condition x∈[0,1]q(x)≤ π211, then λnλm≤ 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.