On the Hausdorff and packing measures of slices of dynamically defined sets

Abstract

Let 1 m<n be integers, and let K⊂Rn be a self-similar set satisfying the strong separation condition, and with K=s>m. We study the a.s. values of the s-m-dimensional Hausdorff and packing measures of K V, where V is a typical n-m-dimensional affine subspace. For 0<<12 let C⊂[0,1] be the attractor of the IFS \f,1,f,2\, where f,1(t)=· t and f,2(t)=· t+1- for each t∈R. We show that for certain numbers 0<a,b<12, for instance a=14 and b=13, if K=Ca× Cb then typically we have Hs-m(K V)=0.