On the generalized Hausdorff dimension of Besicovitch sets

Abstract

Keich (1999) showed that the sharp gauge function for the generalized Hausdorff dimension of Besicovitch sets in R2 is between r2 1/r and r2( 1/r) ( 1/r)2+ by refining an argument of Bourgain (1991). It is not known whether the iterated logarithms in Keich's bound are necessary. In this paper we construct a family of Besicovitch line sets whose sharp gauge function is smaller than r2( 1/r) ( 1/r). Moreover, these Besicovitch sets are minimal in the sense that there is essentially only one line in the set pointing in each direction.