Effective equidistribution of circles in the limit sets of Kleinian groups

Abstract

Consider a general circle packing P in the complex plane C invariant under a Kleinian group . When is convex-cocompact or its critical exponent is greater than 1, we obtain an effective equidistribution for small circles in P intersecting any bounded connected regular set in C; this provides an effective version of an earlier work of Oh-Shah. In view of the recent result of McMullen-Mohammadi-Oh, our effective circle counting theorem applies to the circles contained in the limit set of a convex-cocompact but non-cocompact Kleinian group whose limit set contains at least one circle. Moreover consider the circle packing P(T) of the ideal triangle attained by filling in largest inner circles. We give an effective estimate to the number of disks whose hyperbolic areas are greater than t, as t 0, effectivising the work of Oh.