A basic introduction to large deviations: Theory, applications, simulations

TL;DR

This paper introduces the fundamental concepts of large deviation theory, explores its applications across various scientific fields, and discusses numerical methods for estimating rare event probabilities, making it accessible for students and researchers.

Contribution

It provides an accessible introduction to large deviation theory, connecting physical concepts with mathematical formalism, and discusses basic numerical techniques for evaluating rare event probabilities.

Findings

Introduces large deviation principles in non-technical terms

Applies theory to simple stochastic processes like sums and Markov processes

Discusses importance sampling and exponential change of measure for numerical evaluation

Abstract

The theory of large deviations deals with the probabilities of rare events (or fluctuations) that are exponentially small as a function of some parameter, e.g., the number of random components of a system, the time over which a stochastic system is observed, the amplitude of the noise perturbing a dynamical system or the temperature of a chemical reaction. The theory has applications in many different scientific fields, ranging from queuing theory to statistics and from finance to engineering. It is also increasingly used in statistical physics for studying both equilibrium and nonequilibrium systems. In this context, deep analogies can be made between familiar concepts of statistical physics, such as the entropy and the free energy, and concepts of large deviation theory having more technical names, such as the rate function and the scaled cumulant generating function. The first part of these notes introduces the basic elements of large deviation theory at a level appropriate for advanced undergraduate and graduate students in physics, engineering, chemistry, and mathematics. The focus there is on the simple but powerful ideas behind large deviation theory, stated in non-technical terms, and on the application of these ideas in simple stochastic processes, such as sums of independent and identically distributed random variables and Markov processes. Some physical applications of these processes are covered in exercises contained at the end of each section. In the second part, the problem of numerically evaluating large deviation probabilities is treated at a basic level. The fundamental idea of importance sampling is introduced there together with its sister idea, the exponential change of measure. Other numerical methods based on sample means and generating functions, with applications to Markov processes, are also covered.