Pablo Shmerkin, Boris Solomyak
Published 2015-04-02Version 1
We prove that complex Bernoulli convolutions are absolutely continuous in the supercritical parameter region, outside of an exceptional set of parameters of zero Hausdorff dimension. Similar results are also obtained in the biased case, and for other parametrized families of self-similar sets and measures in the complex plane, extending earlier results.
Comments: 22 pages, no figures
On the exceptional set for absolute continuity of Bernoulli convolutions
Absolute continuity of self-similar measures on the plane
On the "Mandelbrot set" for a pair of linear maps and complex Bernoulli convolutions
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