An improved result for Falconer's distance set problem in even dimensions

Du, XM; Iosevich, A; Ou, YM; Wang, H; Zhang, RX

Zhang, RX (corresponding author), Inst Adv Study, Sch Math, Princeton, NJ 08540 USA.; Zhang, RX (corresponding author), Univ Wisconsin Madison, Dept Math, Madison, WI 53706 USA.

MATHEMATISCHE ANNALEN, 2021; 380 (3-4): 1215

Abstract

We show that if compact set E subset of R-d has Hausdorff dimension larger than d/2 + 1/4, where d >= 4 is an even integer, then the distance set o......

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