English

The Triple Lattice PETs

Dynamical Systems 2017-03-29 v3

Abstract

Polytope exchange transformations (PETs) are higher dimensional generalizations of interval exchange transformations (IETs) which have been well-studied for more than 40 years. A general method of constructing PETs based on multigraphs was described by R. Schwartz in 2013. In this paper, we describe a one-parameter family of multigraph PETs called the triple lattice PETs. We show that there exists a renormalization scheme of the triple lattice PETs in the interval (0,1)(0,1). We analyze the the limit set Λϕ\Lambda_\phi with respect to the parameter ϕ=1+52\phi=\frac{-1+\sqrt 5}{2}. By renormalization, we show that Λϕ\Lambda_\phi is the limit of embedded polygons in R2\mathbb R^2 and its Hausdorff dimension satisfies the inequality 1<dimH(Λϕ)=log(21)/log(ϕ)<21< \dim_H(\Lambda_\phi) = \log(\sqrt 2-1)/\log(\phi)<2 so that Λϕ\Lambda_\phi has Lebesgue measure zero.

Cite

@article{arxiv.1610.03814,
  title  = {The Triple Lattice PETs},
  author = {Ren Yi},
  journal= {arXiv preprint arXiv:1610.03814},
  year   = {2017}
}
R2 v1 2026-06-22T16:19:02.643Z