Counting function of the embedded eigenvalues for some manifold with cusps, and magnetic Laplacian

Abstract

We consider a non compact, complete manifold M of finite area with cuspidal ends. The generic cusp is isomorphic to X× ]1,+∞ [ with metric ds2=(h+dy2)/y2δ. X is a compact manifold with nonzero first Betti number equipped with the metric h. For a one-form A on M such that in each cusp A is a non exact one-form on the boundary at infinity, we prove that the magnetic Laplacian -A=(id+A) (id+A) satisfies the Weyl asymptotic formula with sharp remainder. We deduce an upper bound for the counting function of the embedded eigenvalues of the Laplace-Beltrami operator - =-0.