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Topological Optimization and Optimal Transport
Latest Publications
TOTAL DOCUMENTS
19
(FIVE YEARS 0)
H-INDEX
2
(FIVE YEARS 0)
Published By De Gruyter
9783110430417
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Latest Documents
Most Cited Documents
Contributed Authors
Related Sources
Related Keywords
8. Weak Monge–Ampère solutions of the semi-discrete optimal transportation problem
Topological Optimization and Optimal Transport
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10.1515/9783110430417-009
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2017
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Author(s):
Jean-David Benamou
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Brittany D. Froese
Keyword(s):
Transportation Problem
◽
Optimal Transportation
◽
Optimal Transportation Problem
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Monge Ampere
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9. Optimal transportation theory with repulsive costs
Topological Optimization and Optimal Transport
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10.1515/9783110430417-010
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2017
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Cited By ~ 2
Author(s):
Simone Di Marino
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Augusto Gerolin
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Luca Nenna
Keyword(s):
Optimal Transportation
◽
Transportation Theory
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Frontmatter
Topological Optimization and Optimal Transport
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10.1515/9783110430417-fm
◽
2017
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4. High-order topological expansions for Helmholtz problems in 2D
Topological Optimization and Optimal Transport
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10.1515/9783110430417-004
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2017
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Cited By ~ 4
Author(s):
Victor A. Kovtunenko
Keyword(s):
High Order
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3. Distributed and boundary control problems for the semidiscrete Cahn–Hilliard/Navier–Stokes system with nonsmooth Ginzburg–Landau energies
Topological Optimization and Optimal Transport
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10.1515/9783110430417-003
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2017
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Cited By ~ 2
Author(s):
M. Hintermüller
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D. Wegner
Keyword(s):
Boundary Control
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Stokes System
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Navier Stokes
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Control Problems
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Ginzburg Landau
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Boundary Control Problems
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Contents
Topological Optimization and Optimal Transport
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10.1515/9783110430417-toc
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2017
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15. Interpretation of finite volume discretization schemes for the Fokker–Planck equation as gradient flows for the discrete Wasserstein distance
Topological Optimization and Optimal Transport
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10.1515/9783110430417-016
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2017
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Cited By ~ 1
Author(s):
F. Al Reda
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B. Maury
Keyword(s):
Finite Volume
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Planck Equation
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Wasserstein Distance
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Gradient Flows
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Fokker Planck Equation
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Finite Volume Discretization
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Discretization Schemes
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Fokker Planck
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Preface
Topological Optimization and Optimal Transport
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10.1515/9783110430417-008
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2017
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Author(s):
Guillaume Carlier
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Thierry Champion
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Filippo Santambrogio
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12. On some nonlinear evolution systems which are perturbations of Wasserstein gradient flows
Topological Optimization and Optimal Transport
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10.1515/9783110430417-013
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2017
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Cited By ~ 1
Author(s):
Maxime Laborde
Keyword(s):
Nonlinear Evolution
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Gradient Flows
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Wasserstein Gradient Flows
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Evolution Systems
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13. Pressureless Euler equations with maximal density constraint: a time-splitting scheme
Topological Optimization and Optimal Transport
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10.1515/9783110430417-014
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2017
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Cited By ~ 1
Author(s):
B. Maury
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A. Preux
Keyword(s):
Euler Equations
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Splitting Scheme
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Maximal Density
◽
Time Splitting
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