Quantization Condition of the Bound States in nth-order Schr\"odinger equations

Abstract

We prove a general approximate quantization rule ∫LEREk0(x) dx=(N+12)π or k0(x) dx=(2N+1)π (including both forward and backward processes) for the bound states in the potential well of the nth-order Schr\"odinger equations e-iπ n/2dn(x)d xn =[E- V(x)](x) , where k0(x)=(E-V(x) )1/n with N∈N0 , n is an even natural number, and LE and RE the boundary points between the classically forbidden regions and the allowed region. The only hypothesis is that all exponentially growing components are negligible, which is appropriate for not narrow wells. Applications including the Schr\"odinger equation and Bogoliubov-de Gennes equation will be discussed.