Counting orbits of certain infinitely generated non-sharp discontinuous groups for the anti-de Sitter space

Abstract

Inspired by an example of Gueritaud-Kassel [Geom. Topol. 2017], we construct a family of infinitely generated discontinuous groups for the 3-dimensional anti-de Sitter space AdS3. These groups are not necessarily sharp (a kind of "strong" properly discontinuous condition introduced by Kassel and Kobayashi [Adv. Math. 2016]), and we give its criterion. Moreover, we find upper and lower bounds of the counting N(R) of a -orbit contained in a pseudo-ball B(R) as the radius R tends to infinity. We then find a non-sharp discontinuous group for which there exist infinitely many L2-eigenvalues of the Laplacian on the noncompact anti-de Sitter manifold 3, by applying the method established by Kassel-Kobayashi. We also prove that for any increasing function f, there exists a discontinuous group for AdS3 such that the counting N(R) of a -orbit is larger than f(R) for sufficiently large R.