We consider a planar convex body C and we prove several analogs of Roth's theorem on irregularities of distribution. When the boundary of C is C_2 we prove that for every set of N points in the unit square we have the sharp lower bound N^{1/4} for the L^2 discrepancy. When the boundary is only piecewise C_2 and is not a polygon we have the sharp lower bound N^{1/5}. We also give a whole range of intermediate sharp results between N^{1/5} and N^{1/4}. Our proofs depend on a lemma of Cassels-Montgomery, on ad hoc constructions of finite point sets, and on a geometric type estimate for the average decay of the Fourier transform of the characteristic function of C.

Brandolini, L., Travaglini, G. (2022). Irregularities of distribution and geometry of planar convex sets. ADVANCES IN MATHEMATICS, 396(12 February 2022) [10.1016/j.aim.2021.108162].

Irregularities of distribution and geometry of planar convex sets

Travaglini, Giancarlo
2022

Abstract

We consider a planar convex body C and we prove several analogs of Roth's theorem on irregularities of distribution. When the boundary of C is C_2 we prove that for every set of N points in the unit square we have the sharp lower bound N^{1/4} for the L^2 discrepancy. When the boundary is only piecewise C_2 and is not a polygon we have the sharp lower bound N^{1/5}. We also give a whole range of intermediate sharp results between N^{1/5} and N^{1/4}. Our proofs depend on a lemma of Cassels-Montgomery, on ad hoc constructions of finite point sets, and on a geometric type estimate for the average decay of the Fourier transform of the characteristic function of C.
Articolo in rivista - Articolo scientifico
Cassels-Montgomery lemma; Fourier transforms; Geometric discrepancy; Inner disk condition; Irregularities of distribution; Roth's theorem;
English
3-gen-2022
2022
396
12 February 2022
108162
none
Brandolini, L., Travaglini, G. (2022). Irregularities of distribution and geometry of planar convex sets. ADVANCES IN MATHEMATICS, 396(12 February 2022) [10.1016/j.aim.2021.108162].
File in questo prodotto:
Non ci sono file associati a questo prodotto.

I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.

Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10281/343230
Citazioni
  • Scopus 4
  • ???jsp.display-item.citation.isi??? 4
Social impact