Hausdorff dimension of intersections with planes and general sets

Abstract

We give conditions on a general family Pλ:nm, λ ∈ , of orthogonal projections which guarantee that the Hausdorff dimension formula A Pλ-1\u\=s-m holds generically for measurable sets A⊂ with positive and finite s-dimensional Hausdorff measure, s>m, and with positive lower density. As an application we prove for measurable sets A,B⊂ with positive s- and t-dimensional measures, and with positive lower density that if s + (n-1)t/n > n, then A (g(B)+z) = s+t - n for almost all rotations g and for positively many z∈.