Hecke triangle groups, transfer operators and Hausdorff dimension

Abstract

We consider the family of Hecke triangle groups w = S, Tw generated by the M\"obius transformations S : z -1/z and Tw : z z+w with w > 2. In this case the corresponding hyperbolic quotient w2 is an infinite-area orbifold. Moreover, the limit set of w is a Cantor-like fractal whose Hausdorff dimension we denote by δ(w). The first result of this paper asserts that the twisted Selberg zeta function Z_ w(s, ) , where : w U(V) is an arbitrary finite-dimensional unitary representation, can be realized as the Fredholm determinant of a Mayer-type transfer operator. This result has a number of applications. We study the distribution of the zeros in the half-plane Re(s) > 12 of the Selberg zeta function of a special family of subgroups ( wn )n∈ N of w. These zeros correspond to the eigenvalues of the Laplacian on the associated hyperbolic surfaces Xwn = wn H2. We show that the classical Selberg zeta function Z_w(s) can be approximated by determinants of finite matrices whose entries are explicitly given in terms of the Riemann zeta function. Moreover, we prove an asymptotic expansion for the Hausdorff dimension δ(w) as w ∞.