Buffon's needle estimates for rational product Cantor sets

Abstract

Let S∞=A∞× B∞ be a self-similar product Cantor set in the complex plane, defined via S∞=j=1L Tj(S∞), where Tj: have the form Tj(z)=1Lz+zj and \z1,...,zL\=A+iB for some A,B⊂ with |A|,|B|>1 and |A||B|=L. Let SN be the L-N-neighbourhood of S∞, or equivalently (up to constants), its N-th Cantor iteration. We are interested in the asymptotic behaviour as N∞ of the Favard length of SN, defined as the average (with respect to direction) length of its 1-dimensional projections. If the sets A and B are rational and have cardinalities at most 6, then the Favard length of SN is bounded from above by CN-p/ N for some p>0. The same result holds with no restrictions on the size of A and B under certain implicit conditions concerning the generating functions of these sets. This generalizes the earlier results of Nazarov-Perez-Volberg, aba-Zhai, and Bond-Volberg.