Hongbin Sun
Published 2012-09-12, updated 2013-05-09Version 4
For each pseudo-Anosov map $\phi$ on surface $S$, we will associate it with a $\mathbb{Q}$-submodule of $\mathbb{R}$, denoted by $A(S,\phi)$. $A(S,\phi)$ is defined by an interaction between the Thurston norm and dilatation of pseudo-Anosov maps. We will develop a few nice properties of $A(S,\phi)$ and give a few examples to show that $A(S,\phi)$ is a nontrivial invariant. These nontrivial examples give an answer to a question asked by McMullen: the minimal point of the restriction of the dilatation function on fibered face need not be a rational point.
Comments: 32 pages, 10 figures, abstract has been modified by following suggestion from Curtis McMullen
Polynomial invariants of pseudo-Anosov maps
Lifts of pseudo-Anosov homeomorphisms of nonorientable surfaces have vanishing SAF invariant
On Translation Lengths of Pseudo-Anosov Maps on the Curve Graph
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