International audienceContinuing the line of research initiated in Iksanov and Möhle (2008) and Negadajlov (2008) we investigate the asymptotic (as $n \to \infty$) behaviour of $V_n$ the number of zero increments before the absorption in a random walk with the barrier $n$. In particular, when the step of the unrestricted random walk has a finite mean, we prove that the number of zero increments converges in distribution. We also establish a weak law of large numbers for $V_n$ under a regular variation assumption
17 pages, 1 figureIn this article we refine well-known results concerning the fluctuations of one-di...
deviations, mixing We prove a weak version of the law of large numbers for multi-dimensional ¯nite r...
6 pages + 5 pages of supplemental material, 5 figures. Published versionInternational audienceWe stu...
Continuing the line of research initiated in Iksanov and Möhle (2008) and Negadajlov (2008) we inves...
The steps of a one-dimensional random walk are positive and occur randomly in time at a fixed mean r...
AbstractA one-dimensional random walk with unequal step lengths restricted by an absorbing barrier i...
Abstract. In this article we refine well-known results concerning the fluctuations of one-dimensiona...
In this article we refine well-known results concerning the fluctuations of one-dimensional random w...
We study asymptotic properties of spatially non-homogeneous random walks with non-integrable increme...
AbstractIn this paper, we derive some basic renewal theorems for random walks with widely dependent ...
International audienceWe consider transient random walks in random environment on $\z$ with zero asy...
Let {Sn, n [epsilon] N)} be a simple random walk and denote by An its time average: An = (S1+ ...+Sn...
We prove that the number γN of the zeros of a two-parameter simple random walk in its first N×N time...
We establish an integral test involving only the distribution of the increments of a random walk S w...
Let (Xi)i1 be i.i.d. random variables with EX1 = 0, regularly varying with exponent a > 2 and taP(jX...
17 pages, 1 figureIn this article we refine well-known results concerning the fluctuations of one-di...
deviations, mixing We prove a weak version of the law of large numbers for multi-dimensional ¯nite r...
6 pages + 5 pages of supplemental material, 5 figures. Published versionInternational audienceWe stu...
Continuing the line of research initiated in Iksanov and Möhle (2008) and Negadajlov (2008) we inves...
The steps of a one-dimensional random walk are positive and occur randomly in time at a fixed mean r...
AbstractA one-dimensional random walk with unequal step lengths restricted by an absorbing barrier i...
Abstract. In this article we refine well-known results concerning the fluctuations of one-dimensiona...
In this article we refine well-known results concerning the fluctuations of one-dimensional random w...
We study asymptotic properties of spatially non-homogeneous random walks with non-integrable increme...
AbstractIn this paper, we derive some basic renewal theorems for random walks with widely dependent ...
International audienceWe consider transient random walks in random environment on $\z$ with zero asy...
Let {Sn, n [epsilon] N)} be a simple random walk and denote by An its time average: An = (S1+ ...+Sn...
We prove that the number γN of the zeros of a two-parameter simple random walk in its first N×N time...
We establish an integral test involving only the distribution of the increments of a random walk S w...
Let (Xi)i1 be i.i.d. random variables with EX1 = 0, regularly varying with exponent a > 2 and taP(jX...
17 pages, 1 figureIn this article we refine well-known results concerning the fluctuations of one-di...
deviations, mixing We prove a weak version of the law of large numbers for multi-dimensional ¯nite r...
6 pages + 5 pages of supplemental material, 5 figures. Published versionInternational audienceWe stu...