In proving large deviation estimates, the lower bound for open sets and upper bound for compact sets are essentially local estimates. On the other hand, the upper bound for closed sets is global and compactness of space or an exponential tightness estimate is needed to establish it. In dealing with the occupation measure $L_t(A)=\frac{1}{t}\int_0^t{\1}_A(W_s) \d s$ of the $d$ dimensional Brownian motion, which is not positive recurrent, there is no possibility of exponential tightness. The space of probability distributions $\mathcal {M}_1(\R^d)$ can be compactified by replacing the usual topology of weak c onvergence by the vague toplogy, where the space is treated as the dual of continuous functions with compact support. This is essential...
AbstractWe study the large deviations and the central limit theorem for the occupation time function...
A quenched large deviation principle for Brownian motion in a stationary potential is proved. As the...
We discuss the large deviation principle of stochastic processes as random elements of l∞(T). We sho...
In proving large deviation estimates, the lower bound for open sets and upper bound for compact sets...
Contains fulltext : 21731___.PDF (publisher's version ) (Open Access
AbstractLarge-deviation principles (LDPs) are expressed as the vague or narrow convergence of sequen...
. We combine the Donsker and Varadhan large deviation principle (l.d.p.) for the occupation measure ...
We consider p independent Brownian motions in ℝd. We assume that p ≥ 2 and p(d- 2) < d. Let ℓt deno...
We derive a large deviation principle for the density profile of occupation times of random interlac...
AbstractIn this paper, we establish a small time large deviation principle for diffusion processes o...
The concept of quasi-continuity and the new concept of almost compactness for a function are the bas...
Continuing with the study of compactness and large deviations initiated in citeMV14, we turn to the ...
29 pagesWe prove large deviations principles in large time, for the Brownian occupation time in rand...
Let V be a topological space and B(V ) the Borel oe--field on V . A sequence of probability measures...
We consider the measure-valued processes in a super-Brownian random medium in the Dawson-Fleischmann...
AbstractWe study the large deviations and the central limit theorem for the occupation time function...
A quenched large deviation principle for Brownian motion in a stationary potential is proved. As the...
We discuss the large deviation principle of stochastic processes as random elements of l∞(T). We sho...
In proving large deviation estimates, the lower bound for open sets and upper bound for compact sets...
Contains fulltext : 21731___.PDF (publisher's version ) (Open Access
AbstractLarge-deviation principles (LDPs) are expressed as the vague or narrow convergence of sequen...
. We combine the Donsker and Varadhan large deviation principle (l.d.p.) for the occupation measure ...
We consider p independent Brownian motions in ℝd. We assume that p ≥ 2 and p(d- 2) < d. Let ℓt deno...
We derive a large deviation principle for the density profile of occupation times of random interlac...
AbstractIn this paper, we establish a small time large deviation principle for diffusion processes o...
The concept of quasi-continuity and the new concept of almost compactness for a function are the bas...
Continuing with the study of compactness and large deviations initiated in citeMV14, we turn to the ...
29 pagesWe prove large deviations principles in large time, for the Brownian occupation time in rand...
Let V be a topological space and B(V ) the Borel oe--field on V . A sequence of probability measures...
We consider the measure-valued processes in a super-Brownian random medium in the Dawson-Fleischmann...
AbstractWe study the large deviations and the central limit theorem for the occupation time function...
A quenched large deviation principle for Brownian motion in a stationary potential is proved. As the...
We discuss the large deviation principle of stochastic processes as random elements of l∞(T). We sho...