The Discrete Schwarz-Pick Lemma For Circle Packings Revisited
Abstract
The Discrete Schwarz-Pick Lemma is a discrete analogue of the classical result from complex analysis, arising from the connection between circle packings and conformal maps established by Thurston. Previous works by Beardon-Stephanson and Van Eeuwen proved this lemma for circle packings where circles are tangent or intersect at non-obtuse angles, corresponding to inversive distances I ∈ [0,1]. This paper extends the investigation to circle packings with obtuse intersections (I ∈ (-1,0)) and disjoint packings (I>1). We prove that the Discrete Schwarz-Pick Lemma holds for the full range of intersecting circle packings with inversive distances in (-1,1], provided an additional condition on the weights of each triangle is satisfied. The proof relies on a variational principle for circle packings with inversive distances. Conversely, we show that the lemma fails for disjoint circle packings where I≥1. This is demonstrated by constructing a specific counterexample on a triangulated disk with four vertices.
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