Abstract:
Given a group acting discretely and properly on a metric space,
we are interested in estimating the number of points belonging
to both the orbit of a given point and to a ball of fixed center
when the radius of the ball goes to infinity. Any control of this
asymptotic is a counting theorem.
In this talk we will focus on Kleinian groups, i.e groups
acting on a hyperbolic space. We will start with the historical
background, and proceed with the proposal of a strategy to
obtain counting theorems based on the use of the heat kernel.
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