Functional limit theorems for the maxima of perturbed random walk and divergent perpetuities in the M 1-topology

Iksanov, Alexander; Самойленко, И. В.

doi:10.1007/s10687-017-0288-2

Cited by 7 publications

(10 citation statements)

References 24 publications

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“…In the most interesting, third case, that is, if P(η > x) ∼ cx −2 for some c > 0, both random walk and the perturbation have comparable contributions, see [18,9] along with generalization to functional limit theorems. Further developments have been made recently in [10], where the assumption Eξ 2 k < ∞ is dispensed with.…”

Section: Extremes Of Perturbed Random Walkmentioning

confidence: 99%

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A renewal theorem and supremum of a perturbed random walk

Damek¹,

Kołodziejek²

2018

Electron. Commun. Probab.

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We study tails of the supremum of a perturbed random walk under regime which was not yet considered in the literature. Our approach is based on a new renewal theorem, which is of independent interest.We obtain first and second order asymptotics of the solution to renewal equation under weak assumptions and we apply these results to obtain first and second order asymptotics of the tail of the supremum of a perturbed random walk.

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Section: Extremes Of Perturbed Random Walkmentioning

confidence: 99%

“…and so the tail is essentially bigger than that of B, since L(0, x)/L(x) → ∞ as x → ∞; see (10). Appearance of the function L is probably the most interesting phenomenon here.…”

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confidence: 92%

A renewal theorem and supremum of a perturbed random walk

Damek¹,

Kołodziejek²

2018

Electron. Commun. Probab.

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“…A survey of various results for the so defined PRWs can be found in the book [13]. An incomplete list of more recent papers addressing various aspects of the PRWs includes [1,9,16,21,22,23].…”

Section: Introductionmentioning

confidence: 99%

Renewal theory for iterated perturbed random walks on a general branching process tree: intermediate generations

Bohun¹,

Iksanov²,

Marynych³

et al. 2020

Preprint

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Let (ξ k ,η k ) k∈N be independent identically distributed random vectors with arbitrarily dependent positive components. We call a (globally) perturbed random walk a random sequence (T k ) k∈N defined byFurther, by an iterated perturbed random walk is meant the sequence of point processes defining the birth times of individuals in subsequent generations of a general branching process provided that the birth times of the first generation individuals are given by a perturbed random walk. For j ∈ N and t ≥ 0, denote by N j (t) the number of the jth generation individuals with birth times ≤ t. In this article we prove counterparts of the classical renewal-theoretic results (the elementary renewal theorem, Blackwell's theorem and the key renewal theorem) for N j (t) under the assumption that j = j(t) → ∞ and j(t) = o(t 2/3 ) as t → ∞. According to our terminology, such generations form a subset of the set of intermediate generations.

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“…A major part of the recent book [23] is concerned with the so defined perturbed random walks, both multiplicative and additive. We refer to the cited book for numerous applications of these random sequences and to [1,15,17,24,25] for more recent contributions.…”

Section: Introductionmentioning

confidence: 99%

A result on power moments of Lévy-type perpetuities and its application to the Lp -convergence of Biggins’ martingales in branching Lévy processes

Iksanov¹,

Mallein²

2019

ALEA

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Lévy-type perpetuities being the a.s. limits of particular generalized Ornstein-Uhlenbeck processes are a natural continuous-time generalization of discrete-time perpetuities. These are random variables of the form S := [0,∞) e −Xs− dZ s , where (X, Z) is a two-dimensional Lévy process, and Z is a drift-free Lévy process of bounded variation. We prove an ultimate criterion for the finiteness of power moments of S. This result and the previously known assertion due to Erickson and Maller [18] concerning the a.s. finiteness of S are then used to derive ultimate necessary and sufficient conditions for the L p -convergence for p > 1 and p = 1, respectively, of Biggins' martingales associated to branching Lévy processes. In particular, we provide final versions of results obtained recently by Bertoin and Mallein in [10].

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Functional limit theorems for the maxima of perturbed random walk and divergent perpetuities in the M 1-topology

Cited by 7 publications

References 24 publications

A renewal theorem and supremum of a perturbed random walk

A renewal theorem and supremum of a perturbed random walk

Renewal theory for iterated perturbed random walks on a general branching process tree: intermediate generations

A result on power moments of Lévy-type perpetuities and its application to the Lp -convergence of Biggins’ martingales in branching Lévy processes

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