Spectral Asymptotics on Degenerating Hyperbolic 3-Manifolds

Spectral Asymptotics on Degenerating Hyperbolic 3-Manifolds

Author
Jozef Dodziuk, Jay Jorgenson
Publisher
Amer Mathematical Society
Language
English
Year
1998
Page
75
ISBN
0821808370,9780821808375
File Type
djvu
File Size
721.2 KiB

In this volume, the authors study asymptotics of the geometry and spectral theory of degenerating sequences of finite volume hyperbolic manifolds of three dimensions. Thurston's hyperbolic surgery theorem asserts the existence of non-trivial sequences of finite volume hyperbolic three manifolds which converge to a three manifold with additional cusps. In the geometric aspect of their study, the authors use the convergence of hyperbolic metrics on the thick parts of the manifolds under consideration to investigate convergence of tubes in the manifolds of the sequence to cusps of the limiting manifold.
In the spectral theory aspect of the work, they prove convergence of heat kernels. They then define a regularized heat trace associated to any finite volume, complete, hyperbolic three manifold, and study its asymptotic behavior through degeneration. As an application of the analysis of the regularized heat trace, they study asymptotic behavior of the spectral zeta function, determinant of the Laplacian, Selberg zeta function, and spectral counting functions through degeneration.
The authors' methods are an adaptation to three dimensions of the earlier work of Jorgenson and Lundelius who investigated the asymptotic behavior of spectral functions on degenerating families of finite area hyperbolic Riemann surfaces.

show more...

How to Download?!!!

Just click on START button on Telegram Bot

Free Download Book