For many non-equilibrium dynamics driven by small noise, in physics, chemistry, biology, or economy, rare events do matter. Large deviation theory then explains that the leading order term of the main statistical quantities have an exponential behavior. The exponential rate is often obtained as the infimum of an action, which is minimized along an instanton. In this paper, we consider the computation of the next order sub-exponential prefactors, which are crucial for a large number of applications. Following a path integral approach, we derive the dynamics of the Gaussian fluctuations around the instanton and compute from it the sub-exponential prefactors. As might be expected, the formalism leads to the computation of functional determinan...
Proceedings of the 13th International Summer School on Fundamental Problems in Statistical Physics (...
This thesis is concerned with various aspects of large deviations theory in relation with statistica...
We describe a simple form of importance sampling designed to bound and compute large-deviation rate ...
For many non-equilibrium dynamics driven by small noise, in physics, chemistry, biology, or economy,...
Sharp large deviation estimates for stochastic differential equations with small noise, based on min...
In recent years, instanton calculus has successfully been employed to estimate tail probabilities of...
Motivated by the time behavior of the functional arising in the variational approach to the KPZ equa...
The theory of large deviations deals with the probabilities of rare events (or fluctuations) that ar...
Distribution-dependent stochastic dynamical systems arise widely in engineering and science. We cons...
The theory of large deviations deals with the asymptotic scaling of rare events. It is the modern fr...
We present a path integral calculation of the probability distribution associated with the time-inte...
Transition pathways of stochastic dynamical systems are typically approximated by instantons. Here w...
We describe a framework to reduce the computational effort to evaluate large deviation functions of ...
Large deviation theory and instanton calculus for stochastic systems are widely used to gain insight...
This article concerns the large deviations regime and the consequent solution of the Kramers problem...
Proceedings of the 13th International Summer School on Fundamental Problems in Statistical Physics (...
This thesis is concerned with various aspects of large deviations theory in relation with statistica...
We describe a simple form of importance sampling designed to bound and compute large-deviation rate ...
For many non-equilibrium dynamics driven by small noise, in physics, chemistry, biology, or economy,...
Sharp large deviation estimates for stochastic differential equations with small noise, based on min...
In recent years, instanton calculus has successfully been employed to estimate tail probabilities of...
Motivated by the time behavior of the functional arising in the variational approach to the KPZ equa...
The theory of large deviations deals with the probabilities of rare events (or fluctuations) that ar...
Distribution-dependent stochastic dynamical systems arise widely in engineering and science. We cons...
The theory of large deviations deals with the asymptotic scaling of rare events. It is the modern fr...
We present a path integral calculation of the probability distribution associated with the time-inte...
Transition pathways of stochastic dynamical systems are typically approximated by instantons. Here w...
We describe a framework to reduce the computational effort to evaluate large deviation functions of ...
Large deviation theory and instanton calculus for stochastic systems are widely used to gain insight...
This article concerns the large deviations regime and the consequent solution of the Kramers problem...
Proceedings of the 13th International Summer School on Fundamental Problems in Statistical Physics (...
This thesis is concerned with various aspects of large deviations theory in relation with statistica...
We describe a simple form of importance sampling designed to bound and compute large-deviation rate ...