On the "Mandelbrot set" for a pair of linear maps and complex Bernoulli convolutions

Abstract

We consider the "Mandelbrot set" M for pairs of complex linear maps, introduced by Barnsley and Harrington in 1985 and studied by Bousch, Bandt and others. It is defined as the set of parameters λ in the unit disk such that the attractor Aλ of the IFS \λ z-1, λ z+1\ is connected. We show that a non-trivial portion of M near the imaginary axis is contained in the closure of its interior (it is conjectured that all non-real points of M are in the closure of the set of interior points of M). Next we turn to the attractors Aλ themselves and to natural measures λ supported on them. These measures are the complex analogs of much-studied infinite Bernoulli convolutions. Extending the results of Erd\"os and Garsia, we demonstrate how certain classes of complex algebraic integers give rise to singular and absolutely continuous measures λ. Next we investigate the Hausdorff dimension and measure of Aλ, for λ in the set M, for Lebesgue-a.e. λ. We also obtain partial results on the absolute continuity of λ for a.e. λ of modulus greater than 1/2.

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