Pseudo-Anosov braids with small entropy and the magic $3$-manifold

We consider a surface bundle over the circle, the so-calledmagic manifold $M$. We determine homology classes whoseminimal representatives are genus $0$ fiber surfaces for$M$, and describe their monodromies by braids. Among thoseclasses whose representatives have $n$ punctures for each$n$, we decide which one realizes the minimal entropy. Weshow that for each $n \ge 9$ (resp. $n= 3,4,5,7,8$), thereexists a pseudo-Anosov homeomorphism $\Phi_n: D_n\rightarrow D_n$ with the smallest known entropy (resp. thesmallest entropy) which occurs as the monodromy on an$n$-punctured disk fiber for the Dehn filling of $M$. Apseudo-Anosov homeomorphism $\Phi_6: D_6 \rightarrow D_6$with the smallest entropy occurs as the monodromy on a$6$-punctured disk fiber for $M$.

Full Text (PDF format)

Published 3 February 2012