An elementary approach to simplexes in thin subsets of Euclidean space

Abstract

We prove that if the Hausdorff dimension of E ⊂ Rd, d 3, is greater than \ dk+1k+1, d+k2 \, then the k+1 2-dimensional Lebesgue measure of Tk(E), the set of congruence classes of k-dimensional simplexes with vertices in E, is positive. This improves the best bounds previously known, decreasing the d+k+12 threshold obtained in Erdogan-Hart-Iosevich (2012) to d+k2 via a different and conceptually simpler method. We also give a simpler proof of the d-d-12d threshold for d-dimensional simplexes obtained in Greenleaf-Iosevich (2012), Grafakos-Greenleaf-Iosevich-Palsson (2015).