Kolmogorov operator and Fokker-Planck equation associated to a stochastic Burgers equation driven by Lévy noise
zbMath1328.60148MaRDI QIDQ2340889
Bing Hu, Yingchao Xie, Xiaobin Sun
Publication date: 21 April 2015
Published in: Illinois Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://projecteuclid.org/euclid.ijm/1427897173
Fokker-Planck equationinfinitesimal generatortransition semigroupKolmogorov operatorstochastic Burgers equationLévy noise
Processes with independent increments; Lévy processes (60G51) Stochastic partial differential equations (aspects of stochastic analysis) (60H15) Generation, random and stochastic difference and differential equations (37H10) Fokker-Planck equations (35Q84)
Related Items (1)
Cites Work
- Ergodicity of linear SPDE driven by Lévy noise
- Ergodicity of stochastic 2D Navier-Stokes equation with Lévy noise
- The Kolmogorov operator associated to a Burgers SPDE in spaces of continuous functions
- On a stochastic nonlinear equation arising from 1D integro-differential scalar conservation laws
- \(m\)-dissipativity of Kolmogorov operators corresponding to Burgers equations with space-time white noise
- Algorithm refinement for the stochastic Burgers' equation
- One-dimensional stochastic Burgers equation driven by Lévy processes
- Global solutions of stochastic 2D Navier-Stokes equations with Lévy noise
- Statistics of shocks in solutions of inviscid Burgers equation
- The stochastic Burgers equation
- Dissipativity and invariant measures for stochastic Navier-Stokes equations
- Invariant measures for Burgers equation with stochastic forcing
- Large deviation principle of occupation measure for stochastic Burgers equation
- Poincaré inequality for linear SPDE driven by Lévy noise
- Fluctuation exponent of the KPZ/stochastic Burgers equation
- REPRESENTATION OF PATHWISE STATIONARY SOLUTIONS OF STOCHASTIC BURGERS' EQUATIONS
- Ergodicity for Infinite Dimensional Systems
- A one-dimensional analysis of real and complex turbulence and the Maxwell set for the stochastic Burgers equation
- The partial differential equation ut + uux = μxx
- Stochastic Burgers' equation
- Genealogy of shocks in Burgers turbulence with white noise initial velocity
This page was built for publication: Kolmogorov operator and Fokker-Planck equation associated to a stochastic Burgers equation driven by Lévy noise
