Stationary directed polymers and energy solutions of the Burgers equation
From MaRDI portal
Publication:2196537
DOI10.1016/j.spa.2020.04.012zbMath1451.60067arXiv1908.06591OpenAlexW3021960388MaRDI QIDQ2196537
Milton D. Jara, Gregorio R. Moreno Flores
Publication date: 3 September 2020
Published in: Stochastic Processes and their Applications (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1908.06591
Interacting random processes; statistical mechanics type models; percolation theory (60K35) Disordered systems (random Ising models, random Schrödinger operators, etc.) in equilibrium statistical mechanics (82B44) Stochastic partial differential equations (aspects of stochastic analysis) (60H15)
Related Items (6)
Mean curvature interface limit from Glauber+Zero-range interacting particles ⋮ KPZ-type fluctuation exponents for interacting diffusions in equilibrium ⋮ Derivation of anomalous behavior from interacting oscillators in the high-temperature regime ⋮ Scaling limit of stationary coupled Sasamoto-Spohn models ⋮ Central moments of the free energy of the stationary O'Connell-Yor polymer ⋮ Derivation of the stochastic Burgers equation from totally asymmetric interacting particle systems
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Solving the KPZ equation
- Uniform logarithmic Sobolev inequalities for conservative spin systems with super-quadratic single-site potential
- Evidence for geometry-dependent universal fluctuations of the Kardar-Parisi-Zhang interfaces in liquid-crystal turbulence
- A theory of regularity structures
- A stochastic Burgers equation from a class of microscopic interactions
- Regularization by noise and stochastic Burgers equations
- KPZ reloaded
- Directed polymers in random environments. École d'Été de Probabilités de Saint-Flour XLVI -- 2016
- Tightness of probabilities on C([0,1;\(S_ p\)) and D([0,1];\(S_ p\))]
- Superdiffusivity of the 1D lattice Kardar-Parisi-Zhang equation
- The one-dimensional KPZ equation and its universality class
- Convergence towards Burger's equation and propagation of chaos for weakly asymmetric exclusion processes
- Stochastic Burgers and KPZ equations from particle systems
- Discretisations of rough stochastic PDEs
- Nonlinear perturbation of a noisy Hamiltonian lattice field model: universality persistence
- An invariance principle for the two-dimensional parabolic Anderson model with small potential
- Probabilistic approach to the stochastic Burgers equation
- Scaling of the sasamoto-Spohn model in equilibrium
- Brownian analogues of Burke's theorem.
- On the scaling limits of weakly asymmetric bridges
- Paracontrolled distributions and the 3-dimensional stochastic quantization equation
- The continuum directed random polymer
- Large scale limit of interface fluctuation models
- Paracontrolled distributions on Bravais lattices and weak universality of the 2d parabolic Anderson model
- Second order Boltzmann-Gibbs principle for polynomial functions and applications
- Kardar-Parisi-Zhang equation and large deviations for random walks in weak random environments
- The Kardar-Parisi-Zhang equation as scaling limit of weakly asymmetric interacting Brownian motions
- Space-time discrete KPZ equation
- The intermediate disorder regime for directed polymers in dimension \(1+1\)
- Nonlinear fluctuations of weakly asymmetric interacting particle systems
- Fluctuation exponents for directed polymers in the intermediate disorder regime
- Bounds for scaling exponents for a 1+1 dimensional directed polymer in a Brownian environment
- THE KARDAR–PARISI–ZHANG EQUATION AND UNIVERSALITY CLASS
- Energy solutions of KPZ are unique
- Probability distribution of the free energy of the continuum directed random polymer in 1 + 1 dimensions
- KPZ Scaling Theory and the Semi-discrete Directed Polymer Model
- Dynamic Scaling of Growing Interfaces
- A CLASS OF GROWTH MODELS RESCALING TO KPZ
- The Hairer--Quastel universality result in equilibrium
This page was built for publication: Stationary directed polymers and energy solutions of the Burgers equation
