In this paper, we consider the transfer operator approach to the Ruelle and Selberg zeta functions associated with continued fraction transformations and the geodesic flow on the full modular surface. We extend the results by Ruelle and Mayer to two-variable zeta functions, zeta(q, z) and Z(q, z). The q variable plays the role of the inverse temperature and the introduction of the %26apos;geometric variable%26apos; z is essential in the tentative to provide a general approach, based on the Farey map, to the correspondence between the analytic properties of the zeta functions themselves, the spectral properties of a class of generalized transfer operators and the theory of a generalization of the three-term functional equations studied by Lewis and Zagier. The first step in this direction is a detailed study of the spectral properties of a family of signed transfer operators P-q(+/-) associated with the Farey map.

• 出版日期2014-5