Litcius/Paper detail

Probing large deviations of the Kardar-Parisi-Zhang equation at short times with an importance sampling of directed polymers in random media

Alexander K. Hartmann, Alexandre Krajenbrink, Pierre Le Doussal

2020Physical review. E21 citationsDOIOpen Access PDF

Abstract

The one-point distribution of the height for the continuum Kardar-Parisi-Zhang equation is determined numerically using the mapping to the directed polymer in a random potential at high temperature. Using an importance sampling approach, the distribution is obtained over a large range of values, down to a probability density as small as 10^{-1000} in the tails. The short-time behavior is investigated and compared with recent analytical predictions for the large-deviation forms of the probability of rare fluctuations, showing a spectacular agreement with the analytical expressions. The flat and stationary initial conditions are studied in the full space, together with the droplet initial condition in the half-space.

Topics & Concepts

Statistical physicsProbability density functionProbability distributionMathematicsRange (aeronautics)Distribution (mathematics)Large deviations theorySampling (signal processing)Space (punctuation)PhysicsMathematical analysisStatisticsMaterials scienceOpticsComputer scienceDetectorOperating systemComposite materialTheoretical and Computational PhysicsRandom Matrices and ApplicationsStochastic processes and statistical mechanics