User:Stratus nebulosus/sandbox/Selberg zeta function

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The Selberg zeta-function was introduced by Atle Selberg (1956). It is analogous to the famous Riemann zeta function

\zeta (s)=\prod _{p\in \mathbb {P} }{\frac {1}{1-p^{-s}}}

where $\mathbb {P}$ is the set of prime numbers. The Selberg zeta-function uses the lengths of simple closed geodesics instead of the primes numbers. If $\Gamma$ is a Fuchsian group (that is, a discrete subgroup of PSL(2,R)) and if $\Gamma$ is finitely generated, the associated Selberg zeta function is defined as

Z_{\Gamma }(s)=\prod _{p}\prod _{n=0}^{\infty }(1-N(p)^{-s-n}),

where p runs over conjugacy classes of prime geodesics (equivalently, conjugacy classes of primitive hyperbolic elements of $\Gamma$ ), and N(p) denotes the length of p (equivalently, the square of the bigger eigenvalue of p). The Ihara zeta function is considered a p-adic (and a graph-theoretic) analogue of the Selberg zeta function.

Relation to hyperbolic orbifolds

For any geometrically finite hyperbolic 2-orbifold there is an associated Selberg zeta function. Every hyperbolic 2-orbifold $X$ can be written as a quotient $\Gamma \backslash \mathbb {H} ^{2}$ where $\Gamma$ is a Fuchsian group (if we assume that $\Gamma$ is torsion-free, then X will be a smooth hyperbolic surface). The set of closed primitive geodesics on $X$ is bijective to set of conjugacy classes of the primitive hyperbolic elements of $\Gamma$ . The surface (or orbifold) $X$ is geometric finite if and only if $\Gamma$ is a finitely generated group, in which case the set of primitive closed geodesics is countable. The Selberg zeta function is then defined as

Z_{\Gamma }(s)=\prod _{p}\prod _{n=0}^{\infty }(1-N(p)^{-s-n}),

where p runs over the conjugacy classes of primitive hyperbolic elements of $\Gamma$ and $N(p)$ is length of the corresponding closed geodesic. The Selberg zeta function admits a meromorphic continuation to the whole complex plane.

Zeros and Poles

The zeros and poles of the Selberg zeta-function $Z_{\Gamma }(s)$ can be described in terms of spectral data of the surface $X=\Gamma \backslash \mathbb {H} ^{2}.$

The zeros are at the following points:

For every cusp form with eigenvalue $s_{0}(1-s_{0})$ there exists a zero at the point $s_{0}$ . The order of the zero equals the dimension of the corresponding eigenspace. (A cusp form is an eigenfunction to the Laplace–Beltrami operator which has Fourier expansion with zero constant term.)
The zeta-function also has a zero at every pole of the determinant of the scattering matrix, $\phi (s)$ . The order of the zero equals the order of the corresponding pole of the scattering matrix.

The zeta-function also has poles at $1/2-\mathbb {N}$ , and can have zeros or poles at the points $-\mathbb {N}$ .

Selberg zeta-function for the modular group

For the case where the surface is $\Gamma \backslash \mathbb {H} ^{2}$ , where $\Gamma$ is the modular group, the Selberg zeta-function is of special interest. For this special case the Selberg zeta-function is intimately connected to the Riemann zeta-function.

In this case the determinant of the scattering matrix is given by:

\varphi (s)=\pi ^{1/2}{\frac {\Gamma (s-1/2)\zeta (2s-1)}{\Gamma (s)\zeta (2s)}}.

^{[citation needed]}

In particular, we see that if the Riemann zeta-function has a zero at $s_{0}$ , then the determinant of the scattering matrix has a pole at $s_{0}/2$ , and hence the Selberg zeta-function has a zero at $s_{0}/2$ .^{[citation needed]}

Trasfer operator representations

Growth of Selberg zeta functions

Twisted Selberg zeta functions

References

Fischer, Jürgen (1987), An approach to the Selberg trace formula via the Selberg zeta-function, Lecture Notes in Mathematics, vol. 1253, Berlin, New York: Springer-Verlag, doi:10.1007/BFb0077696, ISBN 978-3-540-15208-8, MR 0892317
Hejhal, Dennis A. (1976), The Selberg trace formula for PSL(2,R). Vol. I, Lecture Notes in Mathematics, Vol. 548, vol. 548, Berlin, New York: Springer-Verlag, doi:10.1007/BFb0079608, MR 0439755
Hejhal, Dennis A. (1983), The Selberg trace formula for PSL(2,R). Vol. 2, Lecture Notes in Mathematics, vol. 1001, Berlin, New York: Springer-Verlag, doi:10.1007/BFb0061302, ISBN 978-3-540-12323-1, MR 0711197
Iwaniec, H. Spectral methods of automorphic forms, American Mathematical Society, second edition, 2002.
Selberg, Atle (1956), "Harmonic analysis and discontinuous groups in weakly symmetric Riemannian spaces with applications to Dirichlet series", J. Indian Math. Soc. (N.S.), 20: 47–87, MR 0088511
Venkov, A. B. Spectral theory of automorphic functions. Proc. Steklov. Inst. Math, 1982.
Sunada, T., L-functions in geometry and some applications, Proc. Taniguchi Symp. 1985, "Curvature and Topology of Riemannian Manifolds", Springer Lect. Note in Math. 1201(1986), 266-284.

Category:Zeta and L-functions Category:Spectral theory