On volumes of simplices in intermediate dimensions

Abstract

A variant of the Falconer distance problem asks for fixed k≥ 1 and d≥ k+1, how large does the Hausdorff dimension of a Borel set E⊂Rd need to be to guarantee that there exist x0,…,xk∈ E such that Volk+1(x0,…,xk)(E) = Volk+1(x0,…,xk,xk+1) : xk+1∈ E has positive Lebesgue measure. Here Volk+1(x0,…,xk,xk+1) denotes the k+1-volume of the k+1 simplex formed by x0,…,xk,xk+1. Recently, Shmerkin and Yavicoli established a sharp dimensional threshold k in the case when d=k+1. In this paper we extend their result to k+1 ≤ d ≤ 2k and obtain a non-trivial dimensional threshold d-k when d>2k. The result is motivated by ideas from Shmerkin and Yavicoli. A crucial part of the argument is an application of work by Bright, Ortiz and Zakharov on a continuum Beck-type theorem for hyperplanes as well as classic results of Marstrand on projections and slicing theorems. In addition, we investigate a more elementary approach under a condition called the Fubini property for Hausdorff dimension as introduced in the work of Héra, Keleti and Máthé.