Christoph Bandt, Alexey Kravchenko
Published 2010-10-05Version 1
While self-similar sets have no tangents at any single point, self-affine curves can be smooth. We consider plane self-affine curves without double points and with two pieces. There is an open subset of parameter space for which the curve is differentiable at all points except for a countable set. For a parameter set of codimension one, the curve is continuously differentiable. However, there are no twice differentiable self-affine curves in the plane, except for parabolic arcs.
Virtually expanding dynamics
Differentiability of Hausdorff dimension of the non-wandering set in a planar open billiard
On the differentiability of hairs for Zorich maps
![QR code for arXiv:1010.0881 [math.DS]](http://oss.arxitics.com/images/favicon.svg)