We study the random field of local time picked up over the entire life of a super-Brownian motion on the real line. The finite-dimensional distributions of the field are characterized via their Laplace transforms by unique solutions of certain boundary-value differential equations. In some cases the one-dimensional distributions can be found explicitly, giving some insight into how super-Brownian motion behaves before extinction or local extinction.Branching Brownian motion first passage process diffusion approximation boundary-value differential equation stable distribution
We study one dimensional Brownian motion with constant drift towards the origin and initial distribu...
AbstractLongtime behavior for the occupation time of a super-Brownian motion with immigration govern...
Given an (ordinary) super-Brownian motion (SBM) #rho# on R"d of dimension d=2, 3, we consider a...
AbstractWe study the random field of local time picked up over the entire life of a super-Brownian m...
We study the local time of super-Brownian motion and the topological boundary of the range of super-...
We establish new fractal properties for superprocess densities. Consider the density of super-Brown...
We consider a 1-dimensional Brownian motion whose diffusion coefficient varies when it crosses the o...
Consider the continuous finite measure-valued super-Brownian motion X on ℝd corresponding to the evo...
61 pagesInternational audienceWe study a one-dimensional diffusion $X$ in a drifted Brownian potenti...
AbstractConsider the finite measure-valued continuous super-Brownian motion X on Rd corresponding to...
Fleischmann and Mueller (Probab. Theory Related Fields 107 (1997) 325) constructed a super-Brownian ...
This paper considers the following generalized almost sure local extinction for the d-dimensional (1...
In view of the interest in the occurrence of anomalous diffusion (<r2(t)>~t2H, 0 < H < ...
We study the asymptotic behavior of a self-interacting one-dimensional Brownian polymer first introd...
International audienceThis paper provides information about the asymptotic behavior of a one-dimensi...
We study one dimensional Brownian motion with constant drift towards the origin and initial distribu...
AbstractLongtime behavior for the occupation time of a super-Brownian motion with immigration govern...
Given an (ordinary) super-Brownian motion (SBM) #rho# on R"d of dimension d=2, 3, we consider a...
AbstractWe study the random field of local time picked up over the entire life of a super-Brownian m...
We study the local time of super-Brownian motion and the topological boundary of the range of super-...
We establish new fractal properties for superprocess densities. Consider the density of super-Brown...
We consider a 1-dimensional Brownian motion whose diffusion coefficient varies when it crosses the o...
Consider the continuous finite measure-valued super-Brownian motion X on ℝd corresponding to the evo...
61 pagesInternational audienceWe study a one-dimensional diffusion $X$ in a drifted Brownian potenti...
AbstractConsider the finite measure-valued continuous super-Brownian motion X on Rd corresponding to...
Fleischmann and Mueller (Probab. Theory Related Fields 107 (1997) 325) constructed a super-Brownian ...
This paper considers the following generalized almost sure local extinction for the d-dimensional (1...
In view of the interest in the occurrence of anomalous diffusion (<r2(t)>~t2H, 0 < H < ...
We study the asymptotic behavior of a self-interacting one-dimensional Brownian polymer first introd...
International audienceThis paper provides information about the asymptotic behavior of a one-dimensi...
We study one dimensional Brownian motion with constant drift towards the origin and initial distribu...
AbstractLongtime behavior for the occupation time of a super-Brownian motion with immigration govern...
Given an (ordinary) super-Brownian motion (SBM) #rho# on R"d of dimension d=2, 3, we consider a...