Convergence of a particle method for a regularized spatially homogeneous Landau equation
José A. Carrillo, Matías G. Delgadino, Jeremy S. H. Wu
Abstract
We study a regularized version of the Landau equation, which was recently introduced in [J. A. Carrillo, J. Hu, L. Wang and J. Wu, A particle method for the homogeneous Landau equation, J. Comput. Phys. X 7 (2020) 100066, 24] to numerically approximate the Landau equation with good accuracy at reasonable computational cost. We develop the existence and uniqueness theory for weak solutions, and we reinforce the numerical findings in the above-mentioned paper by rigorously proving the validity of particle approximations to the regularized Landau equation.
Topics & Concepts
UniquenessConvergence (economics)MathematicsHomogeneousLandau dampingMathematical analysisApplied mathematicsPhysicsQuantum mechanicsPlasmaEconomic growthCombinatoricsEconomicsNumerical methods in engineeringNumerical methods in inverse problemsFractional Differential Equations Solutions