Eigenvalues of Laplacian with constant magnetic field on non-compact hyperbolic surfaces with finite area
Abstract
We consider a magnetic Laplacian -A=(id+A) (id+A) on a noncompact hyperbolic surface with finite area. A is a real one-form and the magnetic field dA is constant in each cusp. When the harmonic component of A satifies some quantified condition, the spectrum of -A is discrete. In this case we prove that the counting function of the eigenvalues of -A satisfies the classical Weyl formula, even when dA=0.
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