On the structure of the lower edge of the spectrum of the periodic magnetic schrÖdinger operator with small magnetic potential

Academic Article

Abstract

  • For the periodic magnetic Schrödinger operator, the structure of the lower edge of the spectrum is investigated. It is known that in the nonmagnetic case the energy depends quadratically on the quasimomentum in the neighborhood of the lower edge of the spectrum. Herewith, the operator admits a convenient “multiplicative” factorization, which makes it possible to investigate the threshold effects efficiently. It is shown that for sufficiently small magnetic potential the magnetic Schrödinger operator also admits a similar factorization. © 2006 American Mathematical Society.
  • Published In

    Digital Object Identifier (doi)

    Author List

  • Shterenberg RG
  • Start Page

  • 865
  • End Page

  • 873
  • Volume

  • 17
  • Issue

  • 5