Favorite Sites of a Persistent Random Walk.

Ghosh, Arka; Noren, Steven; Roitershtein, Alexander

Ghosh, Arka; Noren, Steven; Roitershtein, Alexander.

Afiliação

Ghosh A; Department of Statistics, Iowa State University, Ames, IA.
Noren S; Dept. of Math. and Computer Sci., Monmouth College, IL.
Roitershtein A; Dept. of Statistics, Texas A&M University, College Station, TX.

J Math Anal Appl ; 501(2)2021 Sep 15.

Article em En | MEDLINE | ID: mdl-33888915

ABSTRACT

ABSTRACT

We consider favorite (i.e., most visited) sites of a symmetric persistent random walk on â¤ , a discrete-time process typified by the correlation of its directional history. We show that the cardinality of the set of favorite sites is eventually at most three. This is a generalization of a result by Tóth for a simple random walk, used to partially prove a longstanding conjecture by Erdos and Róvósz. The original conjecture asserting that for the simple random walk on integers the cardinality of the set of favorite sites is eventually at most two was recently disproved by Ding and Shen.

Palavras-chave

60G50; 60J10; 60J55; correlated random walks; discrete Ray-Knight theorems; favorite sites; local time; most visited sites

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Texto completo: 1 Base de dados: MEDLINE Tipo de estudo: Clinical_trials Idioma: En Ano de publicação: 2021 Tipo de documento: Article

Texto completo

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PubMed Links

Buscar no Google

Texto completo: 1 Base de dados: MEDLINE Tipo de estudo: Clinical_trials Idioma: En Ano de publicação: 2021 Tipo de documento: Article