A Lagrangian scheme for the solution of the optimal mass transfer problem
DOI10.1016/j.jcp.2011.01.037zbMath1218.65064OpenAlexW2048660829MaRDI QIDQ543759
Angelo Iollo, Damiano Lombardi
Publication date: 17 June 2011
Published in: Journal of Computational Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jcp.2011.01.037
Hamilton-Jacobi equationnumerical examplesoptimal transportMonge-Kantorovich problemLagrangian methodsoptimal mass transfer problem
Numerical optimization and variational techniques (65K10) Dynamic programming in optimal control and differential games (49L20) Existence theories for optimal control problems involving partial differential equations (49J20) Hamilton-Jacobi equations (35F21)
Related Items (6)
Cites Work
- Unnamed Item
- Unnamed Item
- A variational approach to the macroscopic electrodynamics of anisotropic hard superconductors
- On a system of partial differential equations of Monge--Kantorovich type
- Optimal transport, convection, magnetic relaxation and generalized Boussinesq equations
- Fast/slow diffusion and collapsing sandpiles,
- An elementary proof of the polar factorization of vector-valued functions
- A computational fluid mechanics solution to the Monge-Kantorovich mass transfer problem
- A mathematical framework for a crowd motion model
- An Efficient Numerical Method for the Solution of the $L_2$ Optimal Mass Transfer Problem
- Existence of optimal maps in the reflector-type problems
- Polar factorization and monotone rearrangement of vector‐valued functions
- Minimizing Flows for the Monge--Kantorovich Problem
- The Monge–Kantorovitch mass transfer and its computational fluid mechanics formulation
- Optimal Transport
This page was built for publication: A Lagrangian scheme for the solution of the optimal mass transfer problem
