Abstract. Semilinear equations Lu = ψ(u) where L is an elliptic differential operator and ψ is a positive function can be investigated by using (L, ψ)-superdiffusions. In a special case ∆u = u2 a powerful probabilistic tool – the Brownian snake – introduced by Le Gall was successfully applied by him and his school to get deep results on solutions of this equation. Some of these results (but not all of them) were extended by Dynkin and Kuznetsov to general equations by applying superprocesses. An important role in the theory of the Brownian snake and its applications is played by measures Nx on the space of continuous paths. Our goal is to introduce analogous measures related to superprocesses (and to general branching exit Markov systems). ...
The Kesten-Stigum theorem for the one-type Galton-Watson process gives necessary and sufficient cond...
We give a new, intuitive and relatively straightforward proof of a path large-deviations result for ...
Superprocesses are measure valued diffusions that arise as high density limits of particle systems u...
AbstractWe deal with the probabilistic approach to a nonlinear operator Λ of the form Λu=Δu+∑k=1∞qku...
For about half a century, two classes of stochastic processes-Gaussian processes and processes with ...
We give necessary and sufficient conditions for laws of large numbers to hold in L2 for the empirica...
We introduce several martingale changes of measure of the law of the exit measure of super Brownian ...
AbstractWe introduce several martingale changes of measure of the law of the exit measure of super B...
We offer a probabilistic treatment of the classical problem of existence, uniqueness and asymptotics...
We begin with introducing superprocesses with branching rate functional and historical superprocesse...
AbstractWe give a new, intuitive and relatively straightforward proof of a path large-deviations res...
AbstractTribe proved in a previous paper that a typical point of the support of super Brownian motio...
We study a spatial branching model, where the underlying motion is d-dimensional (d≥1) Brownian moti...
2000 Mathematics Subject Classification: 60J80, 60J85We review several probabilistic techniques that...
In the framework of marked trees, a multitype branching brownian motion, described by measure-valued...
The Kesten-Stigum theorem for the one-type Galton-Watson process gives necessary and sufficient cond...
We give a new, intuitive and relatively straightforward proof of a path large-deviations result for ...
Superprocesses are measure valued diffusions that arise as high density limits of particle systems u...
AbstractWe deal with the probabilistic approach to a nonlinear operator Λ of the form Λu=Δu+∑k=1∞qku...
For about half a century, two classes of stochastic processes-Gaussian processes and processes with ...
We give necessary and sufficient conditions for laws of large numbers to hold in L2 for the empirica...
We introduce several martingale changes of measure of the law of the exit measure of super Brownian ...
AbstractWe introduce several martingale changes of measure of the law of the exit measure of super B...
We offer a probabilistic treatment of the classical problem of existence, uniqueness and asymptotics...
We begin with introducing superprocesses with branching rate functional and historical superprocesse...
AbstractWe give a new, intuitive and relatively straightforward proof of a path large-deviations res...
AbstractTribe proved in a previous paper that a typical point of the support of super Brownian motio...
We study a spatial branching model, where the underlying motion is d-dimensional (d≥1) Brownian moti...
2000 Mathematics Subject Classification: 60J80, 60J85We review several probabilistic techniques that...
In the framework of marked trees, a multitype branching brownian motion, described by measure-valued...
The Kesten-Stigum theorem for the one-type Galton-Watson process gives necessary and sufficient cond...
We give a new, intuitive and relatively straightforward proof of a path large-deviations result for ...
Superprocesses are measure valued diffusions that arise as high density limits of particle systems u...