English

Scaling limits for fractional polyharmonic Gaussian fields

Probability 2025-06-17 v4 Numerical Analysis Analysis of PDEs Numerical Analysis

Abstract

This work is concerned with fractional Gaussian fields, i.e. Gaussian fields whose covariance operator is given by the inverse fractional Laplacian (Δ)s(-\Delta)^{-s} (where, in particular, we include the case s>1s >1). We define a lattice discretization of these fields and show that their scaling limits -- with respect to the optimal Besov space topology (up to an endpoint case) -- are the original continuous fields. As a byproduct, in dimension d<2sd<2s, we prove the convergence in distribution of the maximum of the fields. A key tool in the proof is a sharp error estimate for the natural finite difference scheme for (Δ)s(-\Delta)^s under minimal regularity assumptions, which is also of independent interest.

Keywords

Cite

@article{arxiv.2301.13781,
  title  = {Scaling limits for fractional polyharmonic Gaussian fields},
  author = {Nicola De Nitti and Florian Schweiger},
  journal= {arXiv preprint arXiv:2301.13781},
  year   = {2025}
}

Comments

v2: minor corrections, additional references; v3, v4: further minor corrections, expanded introduction

R2 v1 2026-06-28T08:28:15.589Z