In this paper, we prove that some renowned lower bounds in discrepancy theory admit a discrete analogue. Namely, we prove that the lower bound of the discrepancy for corners in the unit cube due to Roth holds true also for a suitable finite family of corners. We also prove two analogous results for the discrepancy on the torus with respect to squares and balls.
(2025). On a Discrete Approach to Lower Bounds in Discrepancy Theory [journal article - articolo]. In JOURNAL OF FOURIER ANALYSIS AND APPLICATIONS. Retrieved from https://hdl.handle.net/10446/300166
On a Discrete Approach to Lower Bounds in Discrepancy Theory
Brandolini, Luca;Gariboldi, Bianca;Gigante, Giacomo;Monguzzi, Alessandro
2025-01-01
Abstract
In this paper, we prove that some renowned lower bounds in discrepancy theory admit a discrete analogue. Namely, we prove that the lower bound of the discrepancy for corners in the unit cube due to Roth holds true also for a suitable finite family of corners. We also prove two analogous results for the discrepancy on the torus with respect to squares and balls.File allegato/i alla scheda:
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