Geometric Zeta Functions, L2-Theory, and Compact Shimura Manifolds
Abstract
We define geometric zeta functions for locally symmetric spaces as generalizations of the zeta functions of Ruelle and Selberg. As a special value at zero we obtain the Reidemeister torsion of the manifold. For hermitian spaces these zeta functions have as special value the quotient of the holomorphic torsion of Ray and Singer and the holomorphic L2-torsion, where the latter is defined via the L2-theory of Atiyah. For higher fundamental rank twisted torsion numbers appear.
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