Asymptotic formulas for the eigenvalues of a periodic Schrödinger operator and the Bethe-Sommerfeld conjecture

We study the large eigenvalue asymptotics for the Schrödinger operator H V = -1 2 + V on the real and the complex hyperbolic n-spaces. Here is the Laplace-Beltrami operator and V is a scalar potential. We assume that V is real-valued, continuous, semi-bounded from below and diverges at infinity in a

In this paper, the periodic and the Dirichlet problems for the Schrödinger operator -(d 2 /dx 2 )+V are studied for singular, complex-valued potentials V in the Sobolev space H -a per [0, 1] (0 [ a < 1). The following results are shown: (1) The periodic spectrum consists of a sequence (l k ) k \ 0

In this paper we investigate the operator We obtain the asymptotic form of each eigenvalue of H β as β tends to infinity. We also get the asymptotic form of the number of negative eigenvalues of H β in the strong coupling asymptotic regime.