2021
DOI: 10.1007/s10208-021-09503-1
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Primal Dual Methods for Wasserstein Gradient Flows

Abstract: Combining the classical theory of optimal transport with modern operator splitting techniques, we develop a new numerical method for nonlinear, nonlocal partial differential equations, arising in models of porous media, materials science, and biological swarming. Our method proceeds as follows: first, we discretize in time, either via the classical JKO scheme or via a novel Crank–Nicolson-type method we introduce. Next, we use the Benamou–Brenier dynamical characterization of the Wasserstein distance to reduce… Show more

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Cited by 46 publications
(57 citation statements)
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References 121 publications
(246 reference statements)
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“…The approximation of the system ( 12) is a natural strategy to approximate the solution to (1). This approach was for instance at the basis of the works [7,21]. These methods require a sub-time stepping to solve system (12) on each interval (t n−1 , t n ), yielding a possibly important computational cost.…”
Section: Jko Semi-discretizationmentioning
confidence: 99%
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“…The approximation of the system ( 12) is a natural strategy to approximate the solution to (1). This approach was for instance at the basis of the works [7,21]. These methods require a sub-time stepping to solve system (12) on each interval (t n−1 , t n ), yielding a possibly important computational cost.…”
Section: Jko Semi-discretizationmentioning
confidence: 99%
“…set on , complemented with homogeneous Neumann boundary condition ∇φ n τ •n = 0 on ∂ . We can interpret (21) as the one step resolvent of the mean-field game (12). Both the forward in time continuity equation and the backward in time HJ equation are discretized thanks to one step of backward Euler scheme.…”
Section: Implicit Linearization Of the Wasserstein Distance And Ljko Schemementioning
confidence: 99%
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“…Later in [26] Papadakis, Peyré and Oudet introduced a finite difference discretization using staggered grids, which are better suited for the discretization of the continuity equation. Similar finite differences approaches have been used also in more recent works [9,23]. Note that the use of regular grids can be beneficial for the efficient solution of the scheme, but is not adapated to complex domains.…”
Section: Introductionmentioning
confidence: 98%