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Structural Foundations for Leading Digit Laws: Beyond Probabilistic Mixtures

Machine Learning 2025-08-20 v1 Machine Learning Statistics Theory Methodology Statistics Theory

Abstract

This article presents a modern deterministic framework for the study of leading significant digit distributions in numerical data. Rather than relying on traditional probabilistic or mixture-based explanations, we demonstrate that the observed frequencies of leading digits are determined by the underlying arithmetic, algorithmic, and structural properties of the data-generating process. Our approach centers on a shift-invariant functional equation, whose general solution is given by explicit affine-plus-periodic formulas. This structural formulation explains the diversity of digit distributions encountered in both empirical and mathematical datasets, including cases with pronounced deviations from logarithmic or scale-invariant profiles. We systematically analyze digit distributions in finite and infinite datasets, address deterministic sequences such as prime numbers and recurrence relations, and highlight the emergence of block-structured and fractal features. The article provides critical examination of probabilistic models, explicit examples and counterexamples, and discusses limitations and open problems for further research. Overall, this work establishes a unified mathematical foundation for digital phenomena and offers a versatile toolset for modeling and analyzing digit patterns in applied and theoretical contexts.

Keywords

Cite

@article{arxiv.2508.13237,
  title  = {Structural Foundations for Leading Digit Laws: Beyond Probabilistic Mixtures},
  author = {Vladimir Berman},
  journal= {arXiv preprint arXiv:2508.13237},
  year   = {2025}
}

Comments

57 pp, 12 figures

R2 v1 2026-07-01T04:55:26.673Z