论文信息 - THE POWER LAW FOR THE BUFFON NEEDLE PROBABILITY OF THE FOUR-CORNER CANTOR SET

THE POWER LAW FOR THE BUFFON NEEDLE PROBABILITY OF THE FOUR-CORNER CANTOR SET

Let Cn be the n-th generation in the construction of the middle- half Cantor set. The Cartesian square Kn of Cn consists of 4 n squares of side- length 4 −n . The chance that a long needle thrown at random in the unit square will meet Kn is essentially the average length of the projections of Kn, also known as the Favard length of Kn. A classical theorem of Besicovitch implies that the Favard length of Kn tends to zero. It is still an open problem to determine its exact rate of decay. Until recently, the only explicit upper bound was exp( c log∗ n), due to Peres and Solomyak. (log∗ n is the number of times one needs to take log to obtain a number less than 1 starting from n). We obtain a power law bound by combining analytic and combinatorial ideas.

Y. Peres | A. Volberg | F. Nazarov

[1] T. Tao. A quantitative version of the Besicovitch projection theorem via multiscale analysis , 2007, 0706.2646.

[2] S. Mathis,et al. Transport and mixing by internal waves in stellar interiors: effect of the Coriolis force , 2005, 0706.2446.

[3] Joan Verdera,et al. The planar Cantor sets of zero analytic capacity and the local T(b)-theorem , 2002 .

[4] Y. Peres,et al. HOW LIKELY IS BUFFON'S NEEDLE TO FALL NEAR A PLANAR CANTOR SET? , 2002 .

[5] R. Kenyon. Projecting the one-dimensional Sierpinski gasket , 1997 .

[6] Peter W. Jones,et al. POSITIVE ANALYTIC CAPACITY BUT ZERO BUFFON NEEDLE PROBABILITY , 1988 .

[7] A. Besicovitch. Tangential properties of sets and arcs of infinite linear measure , 1960 .

[8] Xavier Tolsa,et al. ON THE ANALYTIC CAPACITY γ+ , 2003 .

[9] Y. Peres,et al. Self-similar sets of zero Hausdorff measure and positive packing measure , 2000 .

[10] G. David. Analytic capacity, Calderón-Zygmund operators, and rectifiability , 1999 .

[11] Jeffrey C. Lagarias,et al. Tiling the line with translates of one tile , 1996 .

[12] P. Mattila. ORTHOGONAL PROJECTIONS, RIESZ CAPACITIES, AND MINKOWSKI CONTENT , 1990 .