On the differentiability of hairs for Zorich maps
Abstract
Devaney and Krych showed that for the exponential family λ ez, where 0<λ <1/e, the Julia set consists of uncountably many pairwise disjoint simple curves tending to ∞. Viana proved that these curves are smooth. In this article we consider a quasiregular counterpart of the exponential map, the so-called Zorich maps, and generalize Viana's result to these maps.
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