We consider a pair of reflected Brownian motions in a Lipschitz planar domain starting from different points but driven by the same Brownian motion. First we construct such a pair of processes in a certain weak sense, since it is not known whether a strong solution to the Skorohod equation in Lipschitz domains exists. Then we prove that the distance between the two processes converges to zero with probability one if the domain has a polygonal boundary or it is a "lip domain," i.e., a domain between the graphs of two Lipschitz functions with Lipschitz constants strictly less than 1.Research partially supported by NSF grant DMS-0071486
We construct a family of SDEs whose solutions select a reflected Brownian flow as well as a stochas...
We consider two skew Brownian motions, driven by the same Brownian motion, with different startingpo...
We construct a family of SDEs with smooth coefficients whose solutions select a reflected Brownian f...
Abstract. We consider a pair of reflected Brownian motions in a Lipschitz planar domain starting fro...
For every bounded planar domain D with a smooth boundary, we define a "Lyapunov exponent" [Lambda](D...
A lip domain is a Lipschitz domain where the Lipschitz constant is strictly less than one. We prove ...
perverse coupling; reflected Brownian motion; reflection coupling; shy coupling; Skorokhod con-struc...
AbstractLet (Dn, vn) n = 1, 2, … be smooth domains and smooth reflection vector fields on ∂Dn approx...
We study a system of two reflected SPDEs which share a moving boundary. The equations describe compe...
A new non-conservative stochastic reaction-diffusion system in which two families of random walks in...
We give a simple proof that in a Lipschitz domain in two dimensions with Lipschitz constant one, the...
Stochastic variational inequalities provide a unified treatment for stochastic differential equation...
Abstract. Suppose that D ⊂ Rn, n ≥ 2, is a Lipschitz domain and let Nt(r) be the number of excursion...
The work in this thesis is based on the study of reflected SPDE (stochastic partial differential equ...
Abstract. We study Brownian motion reflected on an “independent ” Brownian path. We prove results on...
We construct a family of SDEs whose solutions select a reflected Brownian flow as well as a stochas...
We consider two skew Brownian motions, driven by the same Brownian motion, with different startingpo...
We construct a family of SDEs with smooth coefficients whose solutions select a reflected Brownian f...
Abstract. We consider a pair of reflected Brownian motions in a Lipschitz planar domain starting fro...
For every bounded planar domain D with a smooth boundary, we define a "Lyapunov exponent" [Lambda](D...
A lip domain is a Lipschitz domain where the Lipschitz constant is strictly less than one. We prove ...
perverse coupling; reflected Brownian motion; reflection coupling; shy coupling; Skorokhod con-struc...
AbstractLet (Dn, vn) n = 1, 2, … be smooth domains and smooth reflection vector fields on ∂Dn approx...
We study a system of two reflected SPDEs which share a moving boundary. The equations describe compe...
A new non-conservative stochastic reaction-diffusion system in which two families of random walks in...
We give a simple proof that in a Lipschitz domain in two dimensions with Lipschitz constant one, the...
Stochastic variational inequalities provide a unified treatment for stochastic differential equation...
Abstract. Suppose that D ⊂ Rn, n ≥ 2, is a Lipschitz domain and let Nt(r) be the number of excursion...
The work in this thesis is based on the study of reflected SPDE (stochastic partial differential equ...
Abstract. We study Brownian motion reflected on an “independent ” Brownian path. We prove results on...
We construct a family of SDEs whose solutions select a reflected Brownian flow as well as a stochas...
We consider two skew Brownian motions, driven by the same Brownian motion, with different startingpo...
We construct a family of SDEs with smooth coefficients whose solutions select a reflected Brownian f...