Long lines in subsets of large measure in high dimension

Abstract

We show that for any set A⊂eq [0,1]n with Vol(A) 1/2 there exists a line such that the one-dimensional Lebesgue measure of A is at least ( n1/4 ). The exponent 1/4 is tight. More generally, for a probability measure μ on R n and 0<a<1 define equation* L(μ ,a):= ∈fA ; μ(A) = a line | A| equation* where |· | stands for the one-dimensional Lebesgue measure. We study the asymptotic behavior of L(μ ,a) when μ is a product measure and when μ is the uniform measure on the p ball. We observe a rather unified behavior in a large class of product measures. On the other hand, for p balls with 1 ≤ p ≤ ∞ we find that there are phase transitions of different types.