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2008

On the size of the algebraic difference of two random Cantor sets

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On the size of the algebraic difference of two random Cantor sets
In this paper we consider some families of random Cantor sets on the line and investigate the question whether the condition that the sum of Hausdorff dimension is larger than one implies the existence of interior points in the difference set of two independent copies. We prove that this is the case for the so called Mandelbrot percolation. On the other hand the same is not always true if we apply a slightly more general construction of random Cantor sets. We also present a complete solution for the deterministic case.
Michel Dekking, Károly Simon
Added 28 Dec 2010
Updated 28 Dec 2010
Type Journal
Year 2008
Where RSA
Authors Michel Dekking, Károly Simon
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