Moments of the first descending epoch for a random walk with negative drift

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Moments of the first descending epoch for a random walk with negative drift. / Foss, Sergey; Prasolov, Timofei.

в: Statistics and Probability Letters, Том 189, 109547, 10.2022.

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Harvard

Foss, S & Prasolov, T 2022, 'Moments of the first descending epoch for a random walk with negative drift', Statistics and Probability Letters, Том. 189, 109547. https://doi.org/10.1016/j.spl.2022.109547

APA

Foss, S., & Prasolov, T. (2022). Moments of the first descending epoch for a random walk with negative drift. Statistics and Probability Letters, 189, [109547]. https://doi.org/10.1016/j.spl.2022.109547

Vancouver

Foss S, Prasolov T. Moments of the first descending epoch for a random walk with negative drift. Statistics and Probability Letters. 2022 окт.;189:109547. doi: 10.1016/j.spl.2022.109547

Author

Foss, Sergey ; Prasolov, Timofei. / Moments of the first descending epoch for a random walk with negative drift. в: Statistics and Probability Letters. 2022 ; Том 189.

BibTeX

@article{fe7ee2668be7408589a6adc364e170fb,

title = "Moments of the first descending epoch for a random walk with negative drift",

abstract = "We consider the first descending ladder epoch τ=min{n≥1:Sn≤0} of a random walk Sn=∑1nξi,n≥1 with i.d.d. summands having a negative drift Eξ=−a<0. Let ξ+=max(0,ξ1). It is well-known that, for any α>1, the finiteness of E(ξ+)α implies the finiteness of Eτα and, for any λ>0, the finiteness of Eexp(λξ+) implies that of Eexp(cτ) where c>0 is, in general, another constant that depends on the distribution of ξ1. We consider the intermediate case, assuming that Eexp(g(ξ+))<∞ for a positive increasing function g such that lim infx→∞g(x)/logx=∞ and lim supx→∞g(x)/x=0, and that Eexp(λξ+)=∞, for all λ>0. Assuming a few further technical assumptions, we show that then Eexp((1−ɛ)g((1−δ)aτ))<∞, for any ɛ,δ∈(0,1).",

keywords = "Descending ladder epoch, Existence of moments, Heavy tail, Negative drift, Random walk",

author = "Sergey Foss and Timofei Prasolov",

note = "Funding Information: The work is supported by Mathematical Center in Akademgorodok, Russia under agreement No. 075-15-2022-282 with the Ministry of Science and Higher Education of the Russian Federation. Publisher Copyright: {\textcopyright} 2022 Elsevier B.V.",

year = "2022",

month = oct,

doi = "10.1016/j.spl.2022.109547",

language = "English",

volume = "189",

journal = "Statistics and Probability Letters",

issn = "0167-7152",

publisher = "Elsevier Science B.V.",

}

RIS

TY - JOUR

T1 - Moments of the first descending epoch for a random walk with negative drift

AU - Foss, Sergey

AU - Prasolov, Timofei

N1 - Funding Information: The work is supported by Mathematical Center in Akademgorodok, Russia under agreement No. 075-15-2022-282 with the Ministry of Science and Higher Education of the Russian Federation. Publisher Copyright: © 2022 Elsevier B.V.

PY - 2022/10

Y1 - 2022/10

N2 - We consider the first descending ladder epoch τ=min{n≥1:Sn≤0} of a random walk Sn=∑1nξi,n≥1 with i.d.d. summands having a negative drift Eξ=−a<0. Let ξ+=max(0,ξ1). It is well-known that, for any α>1, the finiteness of E(ξ+)α implies the finiteness of Eτα and, for any λ>0, the finiteness of Eexp(λξ+) implies that of Eexp(cτ) where c>0 is, in general, another constant that depends on the distribution of ξ1. We consider the intermediate case, assuming that Eexp(g(ξ+))<∞ for a positive increasing function g such that lim infx→∞g(x)/logx=∞ and lim supx→∞g(x)/x=0, and that Eexp(λξ+)=∞, for all λ>0. Assuming a few further technical assumptions, we show that then Eexp((1−ɛ)g((1−δ)aτ))<∞, for any ɛ,δ∈(0,1).

AB - We consider the first descending ladder epoch τ=min{n≥1:Sn≤0} of a random walk Sn=∑1nξi,n≥1 with i.d.d. summands having a negative drift Eξ=−a<0. Let ξ+=max(0,ξ1). It is well-known that, for any α>1, the finiteness of E(ξ+)α implies the finiteness of Eτα and, for any λ>0, the finiteness of Eexp(λξ+) implies that of Eexp(cτ) where c>0 is, in general, another constant that depends on the distribution of ξ1. We consider the intermediate case, assuming that Eexp(g(ξ+))<∞ for a positive increasing function g such that lim infx→∞g(x)/logx=∞ and lim supx→∞g(x)/x=0, and that Eexp(λξ+)=∞, for all λ>0. Assuming a few further technical assumptions, we show that then Eexp((1−ɛ)g((1−δ)aτ))<∞, for any ɛ,δ∈(0,1).

KW - Descending ladder epoch

KW - Existence of moments

KW - Heavy tail

KW - Negative drift

KW - Random walk

UR - http://www.scopus.com/inward/record.url?scp=85132405993&partnerID=8YFLogxK

UR - https://www.mendeley.com/catalogue/eb756b9d-d8d8-334e-a854-ad8bfd3ce5bc/

U2 - 10.1016/j.spl.2022.109547

DO - 10.1016/j.spl.2022.109547

M3 - Article

AN - SCOPUS:85132405993

VL - 189

JO - Statistics and Probability Letters

JF - Statistics and Probability Letters

SN - 0167-7152

M1 - 109547

ER -

ID: 36559651