English

Pairwise Distance-Diffusion Analysis (PDDA): A Geometric Framework for Estimating Hurst Exponents in Multivariate Long-Memory Processes

Methodology 2026-05-22 v1 Chaotic Dynamics Data Analysis, Statistics and Probability

Abstract

We introduce Pairwise Distance-Diffusion Analysis (PDDA), a geometric framework for estimating the Hurst exponent from distance plots of long-memory stochastic processes. A single construction yields two complementary routes: R/S-PDDA, a geometric reformulation of the classical rescaled-range definition, and MSD-PDDA, based on mean-squared-displacement scaling, classically used in anomalous diffusion. We extend PDDA to multivariate isotropic and anisotropic processes and derive an explicit link between temporal persistence, range dimension, and recurrence statistics, providing a unified distance-based foundation for Hurst analysis.

Keywords

Cite

@article{arxiv.2605.21530,
  title  = {Pairwise Distance-Diffusion Analysis (PDDA): A Geometric Framework for Estimating Hurst Exponents in Multivariate Long-Memory Processes},
  author = {Diogo C. Soriano and Frederique Vanheusden and Slawomir J. Nasuto},
  journal= {arXiv preprint arXiv:2605.21530},
  year   = {2026}
}

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