Richard Evan Schwartz
Published 2011-02-22Version 1
In this long paper we give a fairly complete analysis of outer billiards on the Penrose kite. Our analysis reveals that this 2-dimensional non-compact system has a 3-dimensional compactification, a certain polyhedron exchange map, and that this compactification has a renormalization scheme. These two features allow us to make some sharp statements concerning the distribution, large-scale geometry, fine-scale geometry, and hidden algebraic symmetries of the orbits. For instance, one of our results is that the union of the unbounded orbits has Hausdorff dimension 1. We give a computer-aided proof of the results concerning the compactification and the renormalization. This proof involves finitely many calculations done with exact integer arithmetic.
Comments: This is an extremely long paper -- 142 pages. It might be better as a monograph. I have tried to make the paper as modular as possible, isolating the computer-aided parts into clearly-defined units
Outer Billiards on Kites
Compactification of the energy surfaces for n bodies
Higher order terms of Mather's $β$-function for symplectic and outer billiards
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