English

Local Regularity Estimation through Sobolev-Scale Norm Profile

Numerical Analysis 2026-01-29 v1 Numerical Analysis

Abstract

We develop a kernel-based approach for estimating the spatially varying Sobolev regularity~ss of an unknown dd-variate function~ff from scattered sampling data, which quantifies the degree of local differentiability supported by the data. Relying only on neighborhood data near the point of interest zΩzz\in \Omega_z, our method constructs a sequence of Sobolev-space reproducing kernel interpolants whose kernel smoothness order is specified by an index~m>d/2m > d/2. The native-space norms of these interpolants are evaluated over a bounded range of~mm, producing a \emph{Sobolev-scale norm profile}. The elbow of this profile serves as a quantitative probe of the underlying local regularity~s(Ωz)s(\Omega_z). In particular, when m>s(Ωz)m > s(\Omega_z), the profile exhibits rapid, near-worst-case growth governed by the classical upper bound associated with the conditioning of the kernel matrix. A band-limited surrogate analysis explains this transition and establishes a lower-bound relation linking native-norm growth to the Sobolev regularity of~ff. Two complementary strategies are incorporated for further enhancement: (i)~a \emph{stencil-shift} subroutine, which repositions local neighborhoods to avoid crossing discontinuities whenever possible, thereby suppressing artifacts in the norm estimates; and (ii)~a local--global \emph{norm-sweep comparison} strategy that combines short two-point local tails with an optional one-point global screen to detect outlier Ωz\Omega_z of low Sobolev regularity and accelerate evaluation on large datasets. Numerical experiments on synthetic test functions and turbulent-flow data demonstrate accurate recovery of spatially varying regularity and confirm the robustness of the proposed characterization for kernel-based approximation and differentiation.

Keywords

Cite

@article{arxiv.2601.20207,
  title  = {Local Regularity Estimation through Sobolev-Scale Norm Profile},
  author = {Xiaobin Li and Leevan Ling and Yizhong Sun},
  journal= {arXiv preprint arXiv:2601.20207},
  year   = {2026}
}
R2 v1 2026-07-01T09:23:11.359Z