A Factorization Method in Boundary Crossing Problems for Random Walks

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A Factorization Method in Boundary Crossing Problems for Random Walks. / Lotov, V.

In: Markov Processes And Related Fields, Vol. 25, No. 4, 2019, p. 709-722.

Research output: Contribution to journal › Article › peer-review

Harvard

Lotov, V 2019, 'A Factorization Method in Boundary Crossing Problems for Random Walks', Markov Processes And Related Fields, vol. 25, no. 4, pp. 709-722.

APA

Lotov, V. (2019). A Factorization Method in Boundary Crossing Problems for Random Walks. Markov Processes And Related Fields, 25(4), 709-722.

Vancouver

Lotov V. A Factorization Method in Boundary Crossing Problems for Random Walks. Markov Processes And Related Fields. 2019;25(4):709-722.

Author

Lotov, V. / A Factorization Method in Boundary Crossing Problems for Random Walks. In: Markov Processes And Related Fields. 2019 ; Vol. 25, No. 4. pp. 709-722.

BibTeX

@article{0931b0d6620549609a0d6467ded83ff3,

title = "A Factorization Method in Boundary Crossing Problems for Random Walks",

abstract = "We demonstrate an analytical approach to a number of problems related to crossing linear boundaries by trajectories of a random walk. The main results consist in finding explicit expressions and asymptotic expansions for distributions of various boundary functionals such as first exit time and overshoot, the crossing number of a strip, sojourn time, etc. The method includes several steps. We start with the identities containing Laplace transforms of the joint distributions under study. Wiener-Hopf factorization is the main tool for solving these identities. We thus obtain explicit expressions for the Laplace transforms in terms of factorization components. It turns out that in many cases Laplace transforms are expressed through the special factorization operators which are of particular interest. We further discuss possibilities of exact expressions for these operators, analyze their analytic structure, and obtain asymptotic representations for them under the assumption that the boundaries tend to infinity. After that we invert Laplace transforms asymptotically to get limit theorems and asymptotic expansions, including complete asymptotic expansions.",

keywords = "random walk, boundary crossing problems, factorization method, asymptotic expansions",

author = "V. Lotov",

year = "2019",

language = "English",

volume = "25",

pages = "709--722",

journal = "Markov Processes And Related Fields",

issn = "1024-2953",

publisher = "Polymat",

number = "4",

}

RIS

TY - JOUR

T1 - A Factorization Method in Boundary Crossing Problems for Random Walks

AU - Lotov, V.

PY - 2019

Y1 - 2019

N2 - We demonstrate an analytical approach to a number of problems related to crossing linear boundaries by trajectories of a random walk. The main results consist in finding explicit expressions and asymptotic expansions for distributions of various boundary functionals such as first exit time and overshoot, the crossing number of a strip, sojourn time, etc. The method includes several steps. We start with the identities containing Laplace transforms of the joint distributions under study. Wiener-Hopf factorization is the main tool for solving these identities. We thus obtain explicit expressions for the Laplace transforms in terms of factorization components. It turns out that in many cases Laplace transforms are expressed through the special factorization operators which are of particular interest. We further discuss possibilities of exact expressions for these operators, analyze their analytic structure, and obtain asymptotic representations for them under the assumption that the boundaries tend to infinity. After that we invert Laplace transforms asymptotically to get limit theorems and asymptotic expansions, including complete asymptotic expansions.

AB - We demonstrate an analytical approach to a number of problems related to crossing linear boundaries by trajectories of a random walk. The main results consist in finding explicit expressions and asymptotic expansions for distributions of various boundary functionals such as first exit time and overshoot, the crossing number of a strip, sojourn time, etc. The method includes several steps. We start with the identities containing Laplace transforms of the joint distributions under study. Wiener-Hopf factorization is the main tool for solving these identities. We thus obtain explicit expressions for the Laplace transforms in terms of factorization components. It turns out that in many cases Laplace transforms are expressed through the special factorization operators which are of particular interest. We further discuss possibilities of exact expressions for these operators, analyze their analytic structure, and obtain asymptotic representations for them under the assumption that the boundaries tend to infinity. After that we invert Laplace transforms asymptotically to get limit theorems and asymptotic expansions, including complete asymptotic expansions.

KW - random walk

KW - boundary crossing problems

KW - factorization method

KW - asymptotic expansions

UR - http://math-mprf.org/journal/articles/id1553/

M3 - Article

VL - 25

SP - 709

EP - 722

JO - Markov Processes And Related Fields

JF - Markov Processes And Related Fields

SN - 1024-2953

IS - 4

ER -

ID: 23396346