An estimate from below for the Buffon needle probability of the four-corner Cantor set

Abstract

Let n be the n-th generation in the construction of the middle-half Cantor set. The Cartesian square n = n × n consists of 4n squares of side-length 4-n. The chance that a long needle thrown at random in the unit square will meet n is essentially the average length of the projections of n, also known as the Favard length of n. A classical theorem of Besicovitch implies that the Favard length of n tends to zero. It is still an open problem to determine its exact rate of decay. Until recently, the only explicit upper bound was (- c* n), due to Peres and Solomyak. (* n is the number of times one needs to take log to obtain a number less than 1 starting from n). In Nazarov-Peres-Volberg paper (arxiv:math 0801.2942) the power estimate from above was obtained. The exponent in this paper was less than 1/6 but could have been slightly improved. On the other hand, a simple estimate shows that from below we have the estimate cn. Here we apply the idea from papers of Nets Katz (MRL (1996), 527-536) and Bateman-Katz (arxiv:math/0609187v1 2006) to show that the estimate from below can be in fact improved to c nn. This is in drastic difference from the case of random Cantor sets studied by Peres and Solomyak in Pacific J. Math. 204 (2002), 473-496.