Abstract

Using geometric methods borrowed from the theory of Kleinian groups, we interpret the parabola theorem on continued fractions in terms of sequences of Mobius transformations. This geometric approach allows us to relate the Stern–Stolz series, which features in the parabola theorem, to the dynamics of certain sequences of Mobius transformations acting on three-dimensional hyperbolic space. We also obtain a version of the parabola theorem in several dimensions.

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