The Ray--Knight theorems show that the local time processes of various path fragments derived from a one-dimensional Brownian motion $B$ are squared Bessel processes of dimensions $0$, $2$, and $4$. It is also known that for various singular perturbations $X= |B| + \mu \ell$ of a reflecting Brownian motion $|B|$ by a multiple $\mu$ of its local time process $\ell$ at $0$, corresponding local time processes of $X$ are squared Bessel with other real dimension parameters, both positive and negative. Here, we embed squared Bessel processes of all real dimensions directly in the local time process of $B$. This is done by decomposing the path of $B$ into its excursions above and below a family of continuous random levels determined by the Harriso...
We study the existence and regularity of local times for general $d$-dimensional stochastic processe...
In 1990, Bertoin constructed a measure-valued Markov process in the framework of a Bessel process of...
We prove that, both for the Brownian snake and for super-Brownian motion in dimension one, the histo...
The Ray--Knight theorems show that the local time processes of various path fragments derived from a...
AbstractPerturbed Brownian motion in this paper is defined as Xt = |Bt| - μlt where B is standard Br...
The classical Ray-Knight theorems for Brownian motion determine the law of its local time process ei...
We define a local time flow of skew Brownian motions, i.e., a family of solutions to the stochastic ...
Iterated Bessel processes R[gamma](t),t>0,[gamma]>0 and their counterparts on hyperbolic spaces, i.e...
A stochastic flow of homeomorphisms of R previously studied by Bass and Burdzy [2] and Hu and Warren...
Let X and Y denote two independent squared Bessel processes of dimension m and n-m, respectively, wi...
In this paper, we extend the Harrison and Shepp’s construction of the skew Brownian motion (1981) an...
Let $(B_t,t ≥ 0)$ be a linear Brownian motion and (L(t,x), t > 0, x ∈ ℝ) its local time. We prove th...
We establish two results about local times of spectrally positive stable processes. The first is a g...
Let X be a regular one-dimensional transient diffusion and Ly be its local time at y. The stochastic...
Abstract. We describe the limit laws, as t→∞, of a Bessel process (Rs, s ≤ t) of dimension d ∈ (0, 2...
We study the existence and regularity of local times for general $d$-dimensional stochastic processe...
In 1990, Bertoin constructed a measure-valued Markov process in the framework of a Bessel process of...
We prove that, both for the Brownian snake and for super-Brownian motion in dimension one, the histo...
The Ray--Knight theorems show that the local time processes of various path fragments derived from a...
AbstractPerturbed Brownian motion in this paper is defined as Xt = |Bt| - μlt where B is standard Br...
The classical Ray-Knight theorems for Brownian motion determine the law of its local time process ei...
We define a local time flow of skew Brownian motions, i.e., a family of solutions to the stochastic ...
Iterated Bessel processes R[gamma](t),t>0,[gamma]>0 and their counterparts on hyperbolic spaces, i.e...
A stochastic flow of homeomorphisms of R previously studied by Bass and Burdzy [2] and Hu and Warren...
Let X and Y denote two independent squared Bessel processes of dimension m and n-m, respectively, wi...
In this paper, we extend the Harrison and Shepp’s construction of the skew Brownian motion (1981) an...
Let $(B_t,t ≥ 0)$ be a linear Brownian motion and (L(t,x), t > 0, x ∈ ℝ) its local time. We prove th...
We establish two results about local times of spectrally positive stable processes. The first is a g...
Let X be a regular one-dimensional transient diffusion and Ly be its local time at y. The stochastic...
Abstract. We describe the limit laws, as t→∞, of a Bessel process (Rs, s ≤ t) of dimension d ∈ (0, 2...
We study the existence and regularity of local times for general $d$-dimensional stochastic processe...
In 1990, Bertoin constructed a measure-valued Markov process in the framework of a Bessel process of...
We prove that, both for the Brownian snake and for super-Brownian motion in dimension one, the histo...