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Main Authors: Gouet, Raúl, Lafuente, Miguel, López, F. Javier, Sanz, Gerardo
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2504.01927
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author Gouet, Raúl
Lafuente, Miguel
López, F. Javier
Sanz, Gerardo
author_facet Gouet, Raúl
Lafuente, Miguel
López, F. Javier
Sanz, Gerardo
contents We characterise probability distributions via a martingale property associated with a natural generalisation of record values, known as $δ$-records. For an independent and identically distributed sequence $(X_n)$ with running maximum $M_n$, let $N_n$ be the number of $δ$-records (those $X_k$ with $X_k>M_{k-1}+δ$). We determine distributions for which $N_n-cM_n$ is a martingale, and show that this property uniquely determines the underlying distribution within broad classes. We show that the problem can be reformulated in terms of a delay-integrated Cauchy functional equation. A distinctive feature of this equation is that it is required to hold on a set that depends on the unknown distribution itself, which both complicates the analysis and allows for a rich variety of solutions. A complete characterisation is obtained when $δ<0$. For $δ>0$, all solutions with bounded support are identified. In the case of $δ>0$ and unbounded support, we consider both continuous and lattice distributions. In the continuous case, the characterisation reduces to a delay differential equation, which admits classical exponential-type solutions as well as broader families, including mixtures of exponential and gamma distributions. An analogous discrete analysis leads to difference equations whose solutions include mixtures of geometric and negative binomial distributions. In particular, this yields a new characterisation of the geometric distribution based on weak records.
format Preprint
id arxiv_https___arxiv_org_abs_2504_01927
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Characterisation of distributions via record-like observations
Gouet, Raúl
Lafuente, Miguel
López, F. Javier
Sanz, Gerardo
Probability
60G70 (Primary) 60G42, 62E10, 34K06 (Secondary)
We characterise probability distributions via a martingale property associated with a natural generalisation of record values, known as $δ$-records. For an independent and identically distributed sequence $(X_n)$ with running maximum $M_n$, let $N_n$ be the number of $δ$-records (those $X_k$ with $X_k>M_{k-1}+δ$). We determine distributions for which $N_n-cM_n$ is a martingale, and show that this property uniquely determines the underlying distribution within broad classes. We show that the problem can be reformulated in terms of a delay-integrated Cauchy functional equation. A distinctive feature of this equation is that it is required to hold on a set that depends on the unknown distribution itself, which both complicates the analysis and allows for a rich variety of solutions. A complete characterisation is obtained when $δ<0$. For $δ>0$, all solutions with bounded support are identified. In the case of $δ>0$ and unbounded support, we consider both continuous and lattice distributions. In the continuous case, the characterisation reduces to a delay differential equation, which admits classical exponential-type solutions as well as broader families, including mixtures of exponential and gamma distributions. An analogous discrete analysis leads to difference equations whose solutions include mixtures of geometric and negative binomial distributions. In particular, this yields a new characterisation of the geometric distribution based on weak records.
title Characterisation of distributions via record-like observations
topic Probability
60G70 (Primary) 60G42, 62E10, 34K06 (Secondary)
url https://arxiv.org/abs/2504.01927