Primitive Geometric Markov Partitions for pseudo-Anosov Homeomorphisms

Abstract

Let f be a pseudo-Anosov homeomorphism on a closed, oriented surface. We give an effective construction of Markov partitions for f based on a simple combinatorial criterion deciding when an immersed graph bounds a Markov partition. This yields an explicit algorithm: from a point z at the intersection of stable and unstable separatrices of a singularity of f, and a sufficiently large integer n, it produces a partition R(f,z,n). Applying the algorithm to the first intersection points of f we produces the set of primitive Markov partitions. We prove the existence of an integer n(f), the compatibility order of f, depending only on the conjugacy class of f, such that R(f,z,n) exists for all n n(f) and all first intersection points z. Each geometric Markov partition R has an associated geometric type T(f,R), extending the incidence matrix; it result the geometric type is constant along orbits of primitive partitions, and for n n(f) the set T(f,n) of primitive geometric types is finite. By IntiThesis, this family is canonical: two maps are topologically conjugate by an orientation-preserving homeomorphism iff they share the compatibility order and the primitive geometric types for some n n(f). The types in T(f,n(f)) are minimal and are the canonical Markov partitions of f.

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