Quasiregular maps of Sierpinski carpet Julia sets

Abstract: We prove that if $f$ and $g$ are postcritically finite rational maps whose Julia sets $\mathcal{J}(f), \mathcal{J}(g)$, respectively, are Sierpiński carpets, and if $ξ$ is a quasiregular map of the Riemann sphere $\widehat{\mathbb{C}}$ with $ξ^{-1}(\mathcal{J}(g))=\mathcal{J}(f)$, then $ξ$ is the restriction of a rational map to the Julia set $\mathcal{J}(f)$. Moreover, when $g=f$ we prove that, for some positive integers $k$ and $l$, $f^k\circ ξ^l=f^{2k}$. These conclusions extend the main results of M. Bonk, M. Lyubich, S. Merenkov, Quasisymmetries of Sierpiński carpet Julia sets, Adv. Math, 301 (2016), 383-422. Finally, we demonstrate that when Julia sets of postcritically finite rational maps are not Sierpiński carpets, say they are tree-like or gaskets, the above conclusions no longer hold.