The Monge–Kantorovitch mass transfer and its computational fluid mechanics formulation
From MaRDI portal
Publication:4795180
DOI10.1002/fld.264zbMath1058.76586OpenAlexW2098770975MaRDI QIDQ4795180
Kevin Guittet, Jean-David Benamou, Yann Brenier
Publication date: 23 February 2003
Published in: International Journal for Numerical Methods in Fluids (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1002/fld.264
Related Items
Numerical method for image registration model based on optimal mass transport ⋮ Numerical solution of Monge-Kantorovich equations via a dynamic formulation ⋮ Wasserstein distances in the analysis of time series and dynamical systems ⋮ Modeling crowd dynamics by the mean-field limit approach ⋮ An efficient approach for the numerical solution of the Monge-Ampère equation ⋮ Efficient Approximation of Gromov-Wasserstein Distance Using Importance Sparsification ⋮ Misfit function for full waveform inversion based on the Wasserstein metric with dynamic formulation ⋮ Optimal transport: discretization and algorithms ⋮ Rotation numbers for measure-valued circle maps ⋮ Extended least action principle for steady flows under a prescribed flux ⋮ The fluid dynamic approach to equidistribution methods for grid adaptation ⋮ A Lagrangian scheme for the solution of the optimal mass transfer problem ⋮ Optimal extended optical flow subject to a statistical constraint ⋮ A Variational Model for Joint Motion Estimation and Image Reconstruction ⋮ Fast Entropic Regularized Optimal Transport Using Semidiscrete Cost Approximation ⋮ A Diffusion-Driven Characteristic Mapping Method for Particle Management ⋮ Optimization approach for the Monge-Ampère equation ⋮ Multigrid methods for image registration model based on optimal mass transport ⋮ Minimal Geodesics Along Volume-Preserving Maps, Through Semidiscrete Optimal Transport
Cites Work
