Path-connectivity of Thick Laminations, and Markov Processes with Thick Limit Sets
Abstract
A lamination λ is ε-thick (with respect to a basepoint X), if the Teichm\"uller ray from X in the direction of λ stays in the ε-thick part. We show that, for surfaces of high enough genus, any two ε-thick laminations can be joined by a path of δ-thick laminations. As a consequence, we show that the Morse boundary of the mapping class group is path-connected. Furthermore, we construct a subshift of finite type on the mapping class group, whose limit set consists only of thick laminations and is path-connected.
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