Richard Evan Schwartz
Published 2012-09-11, updated 2012-09-30Version 2
We introduce a family of polytope exchange transformations (PETs) acting on parallelotopes in $\R^{2n}$ for $n=1,2,3...$. These PETs are constructed using a pair of lattices in $\R^{2n}$. The moduli space of these PETs is $GL_n(\R)$. We study the case n=1 in detail. In this case, we show that the 2-dimensional family is completely renormalizable and that the $(2,4,\infty)$ hyperbolic reflection triangle group acts (by linear fractional transformations) as the renormalization group on the moduli space. These results have a number of geometric corollaries for the system. Most of the paper is traditional mathematics, but some part of the paper relies on a rigorous computer-assisted proof involving integer calculations.
Comments: 77 pages, mildly computer-assisted proof. The paper has a companion Java program, available to download from the author's website. This new version has a title change, to reflect the fact that there is now a sequel paper. A result from the sequel is mentioned. Several typos are fixed. 3 references are added
Dimension of the moduli space of a curve in the complex plane
Renormalization and forcing of horseshoe orbits
Limiting distribution of dense orbits in a moduli space of rank $m$ discrete subgroups in $(m+1)$-space
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