On the generalized circle problem for a random lattice in large dimension
From MaRDI portal
Publication:1721972
DOI10.1016/J.AIM.2019.01.034zbMATH Open1471.60017arXiv1611.06332OpenAlexW2963584190MaRDI QIDQ1721972
Author name not available (Why is that?)
Publication date: 13 February 2019
Published in: (Search for Journal in Brave)
Abstract: In this note we study the error term R_{n,L}(x) in the generalized circle problem for a ball of volume x and a random lattice L of large dimension n. Our main result is the following functional central limit theorem: Fix an arbitrary function f(n) from the positive integers to the positive real line, tending to infinity with n but with subexponential growth. Then, the random function t -> (2f(n))^{-1/2} R_{n,L}(t f(n)) on the interval [0,1] converges in distribution to one-dimensional Brownian motion as n tends to infinity. The proof goes via convergence of moments, and for the computations we develop a new version of Rogers' mean value formula. For the individual k:th moment of the variable (2f(n))^{-1/2} R_{n,L}(f(n)) we prove convergence to the corresponding Gaussian moment more generally for functions f satisfying f(n)<<e^{cn} for any fixed c in an interval 0<c<c_k, where c_k is a constant depending on k whose optimal value we determine.
Full work available at URL: https://arxiv.org/abs/1611.06332
No records found.
No records found.
This page was built for publication: On the generalized circle problem for a random lattice in large dimension
Report a bug (only for logged in users!)Click here to report a bug for this page (MaRDI item Q1721972)
