Half-Line non-self-adjoint Schr\"odinger operators with polynomial potentials: Asymptotics of eigenvalues

Abstract

For integers m≥ 3, we study the non-self-adjoint eigenvalue problems -u(x)+(xm+P(x))u(x)=E u(x), 0≤ x<+∞, with the boundary conditions u(+∞)=0 and α u(0)+β u(0)=0 for some α, β∈ with |α|+|β|=0, where P(x)=a1 xm-1+a2 xm-2+...+am-1 x is a polynomial. We provide asymptotic expansions of the eigenvalue counting function and the eigenvalues En. Then we apply these to the inverse spectral problem, reconstructing some coefficients of polynomial potentials from asymptotic expansions of the eigenvalues.

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