English

Lattice points problem, equidistribution and ergodic theorems for certain arithmetic spheres

Dynamical Systems 2021-06-24 v1

Abstract

We establish an asymptotic formula for the number of lattice points in the sets Sh1,h2,h3(λ):={xZ+3:h1(x1)+h2(x2)+h3(x3)=λ}withλZ+; \mathbf S_{h_1, h_2, h_3}(\lambda): =\{x\in\mathbb Z_+^3:\lfloor h_1(x_1)\rfloor+\lfloor h_2(x_2)\rfloor+\lfloor h_3(x_3)\rfloor=\lambda\} \quad \text{with}\quad \lambda\in\mathbb Z_+; where functions h1,h2,h3h_1, h_2, h_3 are constant multiples of regularly varying functions of the form h(x):=xch(x)h(x):=x^c\ell_h(x), where the exponent c>1c>1 (but close to 11) and a function h(x)\ell_h(x) is taken from a certain wide class of slowly varying functions. Taking h1(x)=h2(x)=h3(x)=xch_1(x)=h_2(x)=h_3(x)=x^c we will also derive an asymptotic formula for the number of lattice points in the sets Sc3(λ):={xZ3:x1c+x2c+x3c=λ}withλZ+; \mathbf S_{c}^3(\lambda) := \{x \in \mathbb Z^3 : \lfloor |x_1|^c \rfloor + \lfloor |x_2|^c \rfloor + \lfloor |x_3|^c \rfloor= \lambda \} \quad \text{with}\quad \lambda\in\mathbb Z_+; which can be thought of as a perturbation of the classical Waring problem in three variables. We will use the latter asymptotic formula to study, the main results of this paper, norm and pointwise convergence of the ergodic averages 1#Sc3(λ)nSc3(λ)f(T1n1T2n2T3n3x)asλ; \frac{1}{\#\mathbf S_{c}^3(\lambda)}\sum_{n\in \mathbf S_{c}^3(\lambda)}f(T_1^{n_1}T_2^{n_2}T_3^{n_3}x) \quad \text{as}\quad \lambda\to\infty; where T1,T2,T3:XXT_1, T_2, T_3:X\to X are commuting invertible and measure-preserving transformations of a σ\sigma-finite measure space (X,ν)(X, \nu) for any function fLp(X)f\in L^p(X) with p>114c117cp>\frac{11-4c}{11-7c}. Finally, we will study the equidistribution problem corresponding to the spheres Sc3(λ)\mathbf S_{c}^3(\lambda).

Keywords

Cite

@article{arxiv.2106.12015,
  title  = {Lattice points problem, equidistribution and ergodic theorems for certain arithmetic spheres},
  author = {Alex Iosevich and Bartosz Langowski and Mariusz Mirek and Tomasz Z. Szarek},
  journal= {arXiv preprint arXiv:2106.12015},
  year   = {2021}
}

Comments

61 pages, no figures

R2 v1 2026-06-24T03:29:05.102Z