 Selberg zeta function

The Selberg zeta function is a mathematical object that arises in the study of Riemann surfaces and in number theory, particularly in relation to the theory of automorphic forms and the spectral theory of certain types of differential operators. It was introduced by the mathematician Atle Selberg in the 1950s. ### Definition: The Selberg zeta function is associated with a hyperbolic Riemann surface (or a more general Riemann surface with a finite volume).