This paper "Local connectivity of Julia sets and bifuraction loci: three theorems of J.C.Yoccoz" (link at Hubbard's page) tells that it is quite easy to construct the topology of a puzzle to a given depth by hand (see Remark 5.3). I wonder that for the 1/3-limb, we know that there are three external rays landing at the repelling fixed points $\alpha$, then it is easy to know the knowledge at depth $0$, then the topology of depth $1$ can be got by mapping each puzzle at depth $0$ under $f^{-1}$. Now I am a little confused that how do we know the position of the preimage of $\alpha$, i.e. how do we know which piece does $f^{-1}(\alpha)$ belong to? Furthermore, how do we know that the topology of a puzzle at depth $2$, or depth $n$? Are there any more details can I get from here?
Topology of the Yoccoz puzzles at depth $n$
Yee Neil
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