We consider a class of rescaled superprocesses and derive a full large deviation principle with a good convex rate functional defined on the measure state space. A relatively complete picture of the related non-linear reaction-diffusion equation is accomplished although the rate functional is only partly expressed in terms of solutions of the equation
This article proves that the on-off renewal process with Weibull sojourn times satisfies the large d...
We show a principle of large deviations for sums of random variables which themselve obey a principl...
We discuss the large deviation principle of stochastic processes as random elements of l∞(T). We sho...
We consider a class of rescaled superprocesses and derive a full large deviation principle with a go...
We consider a class of rescaled superprocesses and derive a full large deviation principle with a go...
Particle approximations for certain nonlinear and nonlocal reaction-diffusion equations are studied ...
We formulate the large deviations for a class of two scale chemical kinetic processes motivated from...
In this paper we consider a family of processes which satisfies the large deviation principle with a...
Abstract. We consider a class of diffusion processes on Euclidean spaces, with the drift terms not w...
AbstractCertain results on large deviation probabilities for linear and m-dependent processes are co...
Given a sequence of bounded random variables that satisfies a well known mixing condition, it is sh...
We use process level large deviation analysis to obtain the rate function for a general family of oc...
We consider the measure-valued processes in a super-Brownian random medium in the Dawson-Fleischmann...
We consider a class of diffusion processes on Euclidean spaces, with the drift terms not weaker than...
A large deviation principle is derived for a class of stochastic reaction-diffusion partial differen...
This article proves that the on-off renewal process with Weibull sojourn times satisfies the large d...
We show a principle of large deviations for sums of random variables which themselve obey a principl...
We discuss the large deviation principle of stochastic processes as random elements of l∞(T). We sho...
We consider a class of rescaled superprocesses and derive a full large deviation principle with a go...
We consider a class of rescaled superprocesses and derive a full large deviation principle with a go...
Particle approximations for certain nonlinear and nonlocal reaction-diffusion equations are studied ...
We formulate the large deviations for a class of two scale chemical kinetic processes motivated from...
In this paper we consider a family of processes which satisfies the large deviation principle with a...
Abstract. We consider a class of diffusion processes on Euclidean spaces, with the drift terms not w...
AbstractCertain results on large deviation probabilities for linear and m-dependent processes are co...
Given a sequence of bounded random variables that satisfies a well known mixing condition, it is sh...
We use process level large deviation analysis to obtain the rate function for a general family of oc...
We consider the measure-valued processes in a super-Brownian random medium in the Dawson-Fleischmann...
We consider a class of diffusion processes on Euclidean spaces, with the drift terms not weaker than...
A large deviation principle is derived for a class of stochastic reaction-diffusion partial differen...
This article proves that the on-off renewal process with Weibull sojourn times satisfies the large d...
We show a principle of large deviations for sums of random variables which themselve obey a principl...
We discuss the large deviation principle of stochastic processes as random elements of l∞(T). We sho...