On the size of the algebraic difference of two random Cantor sets
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Publication:5454359
DOI10.1002/rsa.20178zbMath1141.60004arXivmath/0512544OpenAlexW2953325590MaRDI QIDQ5454359
F. Michel Dekking, Károly Simon
Publication date: 28 March 2008
Published in: Random Structures & Algorithms (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/0512544
Related Items (13)
On a variant of the Kakeya problem in \(\mathbb{R}\) ⋮ Projections of planar Mandelbrot random measures ⋮ ARITHMETIC ON MORAN SETS ⋮ Differences of random Cantor sets and lower spectral radii ⋮ The algebraic difference of two random Cantor sets: the Larsson family ⋮ Spatially independent martingales, intersections, and applications ⋮ Correlated fractal percolation and the Palis conjecture ⋮ The dimension of projections of fractal percolations ⋮ Multiplication on self-similar sets with overlaps ⋮ The Lebesgue measure of the algebraic difference of two random Cantor sets ⋮ Projections of fractal percolations ⋮ Dimension of the intersection of certain Cantor sets in the plane ⋮ The Geometry of Fractal Percolation
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