International audienceWe consider regenerative processes with values in some general Polish space. We define their ε-big excursions as excursions e such that φ(e) > ε, where φ is some given functional on the space of excursions which can be thought of as, e.g., the length or the height of e. We establish a general condition that guarantees the convergence of a sequence of regenerative processes involving the convergence of ε-big excursions and of their endpoints, for all ε in a set whose closure contains 0. Finally, we provide various sufficient conditions on the excursion measures of this sequence for this general condition to hold and discuss possible generalizations of our approach to processes that can be written as the concatenation of...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
We construct a family of processes, from a renewal process, that have realizations that converge alm...
We consider regenerative processes with values in some Polish space. We define their \epsilon-big ex...
A notion of convergence of excursion measures is introduced. It is proved that convergence of excurs...
Let B be a continuous additive functional for a standard process (Xt)t∈R+ and let (Yt)t∈R be a stati...
AbstractRegenerative processes were defined and investigated by Smith [12]. These processes have lim...
AbstractThe local time of a Brownian motion can be constructed from its excursions. The normalised e...
We consider a sequence of stochastic processes Xn on C[0, 1] converging weakly to X and call it poly...
International audienceWe consider a spectrally positive Lévy process X that does not drift to +∞, vi...
ABSTRACT. – Let X be a real Lévy process and let X ↑ be the process conditioned to stay positive. We...
Consider a time-inhomogeneous regenerative process starting from regeneration at time s. It is shown...
We introduce regenerative tree growth processes as consistent families of random trees with n labell...
We introduce regenerative tree growth processes as consistent families of random trees with n labell...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
We construct a family of processes, from a renewal process, that have realizations that converge alm...
We consider regenerative processes with values in some Polish space. We define their \epsilon-big ex...
A notion of convergence of excursion measures is introduced. It is proved that convergence of excurs...
Let B be a continuous additive functional for a standard process (Xt)t∈R+ and let (Yt)t∈R be a stati...
AbstractRegenerative processes were defined and investigated by Smith [12]. These processes have lim...
AbstractThe local time of a Brownian motion can be constructed from its excursions. The normalised e...
We consider a sequence of stochastic processes Xn on C[0, 1] converging weakly to X and call it poly...
International audienceWe consider a spectrally positive Lévy process X that does not drift to +∞, vi...
ABSTRACT. – Let X be a real Lévy process and let X ↑ be the process conditioned to stay positive. We...
Consider a time-inhomogeneous regenerative process starting from regeneration at time s. It is shown...
We introduce regenerative tree growth processes as consistent families of random trees with n labell...
We introduce regenerative tree growth processes as consistent families of random trees with n labell...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
We construct a family of processes, from a renewal process, that have realizations that converge alm...