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Ordinal Patterns Based Testing of Spatial Independence in Irregular Spatial Structures

Methodology 2026-03-24 v1 Statistics Theory Statistics Theory

Abstract

We propose a nonparametric test of spatial independence for data observed on irregular, non-lattice point clouds VnR2\mathcal{V}_{n}\subset\mathbb{R}^{2}. For each location vVnv\in\mathcal{V}_{n}, we encode the local spatial configuration through the ordinal pattern of the mm nearest-neighbour observations, obtaining a symbolic representation that is invariant under strictly monotone transformations and robust to outliers. Under the null hypothesis of spatial independence, the local ordinal patterns are i.i.d.\ and uniformly distributed over the symmetric group Sm\mathcal{S}_{m}, regardless of the unknown marginal distribution FF. We exploit this characterisation to construct a test statistic LnL_{n} based on the additive log-ratio (ALR) transformation of the empirical ordinal-pattern frequencies. Invoking a central limit theorem for graph-dependent processes under a graph-based α\alpha-mixing condition, we establish that LnL_{n} converges in distribution to a χm!12\chi^{2}_{m!-1} random variable, yielding an asymptotically pivotal procedure with no nuisance parameters. An extensive Monte Carlo study confirms that the χm!12\chi^{2}_{m!-1} approximation is accurate already at moderate sample sizes, that the test controls size at the nominal level, and that power increases monotonically with the strength of spatial dependence. Notably, the test detects dependence in both linear and nonlinearly transformed spatial autoregressive models, illustrating the robustness that is characteristic of ordinal-pattern methods. Our framework extends the spatial ordinal-pattern testing paradigm from regular lattices to general spatial supports, opening the door to ordinal-pattern inference in the many applied settings where observations are irregularly located.

Keywords

Cite

@article{arxiv.2603.20783,
  title  = {Ordinal Patterns Based Testing of Spatial Independence in Irregular Spatial Structures},
  author = {Giorgio Micali and David Garnés-Galindo and Mariano Matilla-García and Manuel Ruiz-Marín},
  journal= {arXiv preprint arXiv:2603.20783},
  year   = {2026}
}
R2 v1 2026-07-01T11:31:21.730Z