The Ratio of Eigenvalues of the Dirichlet Eigenvalue Problem for Equations with One-Dimensional p-Laplacian

Abstract

Chao-Zhong Chen et al. [Proc. Amer. Math. Soc,2013], proved the upper estimate λ nλ m≤ % npmp (n>m≥ 1) for Dirichlet Shr\"odinger operators with nonnegative and single-well potentials. In this paper we discuss the case of nonpositive potentials q(x) continuous on the interval [ 0,1] . We prove that if q(x)≤ 0 and single-barrier then λ nλ m≥ np% mp for λ n>λ m≥ -2q , where q=∈f\q(0), q(1)\. Furthermore, we show that there exists 0∈ ( 0,1] such that for all ∈(0,0], the associated eigenvalues (λ n()) n≥ 1 (of the problem defined on [0,]) satisfy λ 1( )>0 and λ n( )λ m( ) ≥ npmp n>m≥ 1. The value 0 satisfies the following estimate 0<0≤ [p]-p3q*.