Lattès maps and finite subdivision rules

Abstract: Abstract. This paper is concerned with realizing Lattès maps as subdivision maps of finite subdivision rules. The main result is that the Lattès maps in all but finitely many analytic conjugacy classes can be realized as subdivision maps of finite subdivision rules with one tile type. An example is given of a Lattès map which is not the subdivision map of a finite subdivision rule with either i) two tile types and 1-skeleton of the subdivision complex a circle or ii) one tile type.This paper is concerned with … Show more

“…Thus the number of essential, nonperipheral components of f −1 (δ) is c 3 − c 2 . This proves statement (2). Statements (3) and (4) can be proven similarly.…”

“…A fundamental domain F 1 for the action of Γ 1 on R 2 is hatched in Figure 2. We give F 1 a cell structure so that the boundary of F 1 is its 1-skeleton and its vertices are at (0, 0), (2, −1), (4, −2), (4,3), (2,4) and (0, 5). We regard the hatched region in Figure 2 as a subdivision of F 1 .…”

“…. , (0, 5), (1,5) and h maps the image of (2,4) to the image of (2,5) and the image of (2, −1) to the image of (2, 0). Let f = h • g. The action of f is indicated in Figure 4.…”

“…Let A be a finite Abelian group. Let H be a subset of A which is the disjoint union of four inverse pairs {±h 1 }, {±h 2 …”

“…Our motivation in this work is to better understand Thurston obstructions and the issue of conformality of finite subdivision rules (for which, see [2]). We were led to a class of Thurston maps which are as simple as possible but yet nontrivial in this regard.…”

Nearly Euclidean Thurston maps

“…Thus the number of essential, nonperipheral components of f −1 (δ) is c 3 − c 2 . This proves statement (2). Statements (3) and (4) can be proven similarly.…”

“…A fundamental domain F 1 for the action of Γ 1 on R 2 is hatched in Figure 2. We give F 1 a cell structure so that the boundary of F 1 is its 1-skeleton and its vertices are at (0, 0), (2, −1), (4, −2), (4,3), (2,4) and (0, 5). We regard the hatched region in Figure 2 as a subdivision of F 1 .…”

“…. , (0, 5), (1,5) and h maps the image of (2,4) to the image of (2,5) and the image of (2, −1) to the image of (2, 0). Let f = h • g. The action of f is indicated in Figure 4.…”

“…Let A be a finite Abelian group. Let H be a subset of A which is the disjoint union of four inverse pairs {±h 1 }, {±h 2 …”

“…Our motivation in this work is to better understand Thurston obstructions and the issue of conformality of finite subdivision rules (for which, see [2]). We were led to a class of Thurston maps which are as simple as possible but yet nontrivial in this regard.…”

Nearly Euclidean Thurston maps

Subdivision rules and virtual endomorphisms

A finite subdivision rule for the n-dimensional torus