Slicing Sets and Measures, and the Dimension of Exceptional Parameters

Abstract

We consider the problem of slicing a compact metric space with sets of the form πλ-1\t\, where the mappings πλ , λ ∈ , are generalized projections, introduced by Yuval Peres and Wilhelm Schlag in 2000. The basic question is: assuming that has Hausdorff dimension strictly greater than one, what is the dimension of the 'typical' slice πλ-1t, as the parameters λ and t vary. In the special case of the mappings πλ being orthogonal projections restricted to a compact set ⊂ 2, the problem dates back to a 1954 paper by Marstrand: he proved that for almost every λ there exist positively many t ∈ such that πλ-1t = - 1. For generalized projections, the same result was obtained 50 years later by J\"arvenp\"a\"a, J\"arvenp\"a\"a and Niemel\"a. In this paper, we improve the previously existing estimates by replacing the phrase 'almost all λ' with a sharp bound for the dimension of the exceptional parameters.