On the Asymptotic Behavior of Counting Functions Associated to Degenerating Hyperbolic Riemann Surfaces

Abstract

We develop an asymptotic expansion of the spectral measures on a degenerating family of hyperbolic Riemann surfaces of finite volume. As an application of our results, we study the asymptotic behavior of weighted counting functions, which, if M is compact, is defined for w ≥ 0 and T > 0 by NM,w(T) = Σλn ≤ T(T-λn)w where \λn\ is the set of eigenvalues of the Laplacian which acts on the space of smooth functions on M. If M is non-compact, then the weighted counting function is defined via the inverse Laplace transform. Now let M denote a degenerating family of compact or non-compact hyperbolic Riemann surfaces of finite volume which converges to the non-compact hyperbolic surface M0. As an example of our results, we have the following theorem: There is an explicitly defined function G,w(T) which depends solely on , w, and T such that for w > 3/2 and T>0, we have NM,w(T) = G,w(T) +NM0,w(T) +o(1) for 0. We also consider the setting when w < 3/2, and we obtain a new proof of the continuity of small eigenvalues on degenerating hyperbolic Riemann surfaces of finite volume.

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