Synopsis
In this thesis, we study the regularity of optimal transport maps and its applications to the semi-geostrophic system. The first two chapters survey the known theory, in particular there is a self-contained proof of Brenier’ theorem on existence of optimal transport maps and of Caffarelli’s Theorem on Holder continuity of optimal maps.
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Présentation de l'éditeur
In this thesis, we study the regularity of optimal transport maps and its applications to the semi-geostrophic system. The first two chapters survey the known theory, in particular there is a self-contained proof of Brenier theorem on existence of optimal transport maps and of Caffarelli s Theorem on Holder continuity of optimal maps. In the third and fourth chapter we start investigating Sobolev regularity of optimal transport maps, while in Chapter 5 we show how the above mentioned results allows to prove the existence of Eulerian solution to the semi-geostrophic equation. In Chapter 6 we prove partial regularity of optimal maps with respect to a generic cost functions (it is well known that in this case global regularity can not be expected). More precisely we show that if the target and source measure have smooth densities the optimal map is always smooth outside a closed set of measure zero.
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Regularity of Optimal Transport Maps and Applications
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Edizioni della Normale, 2013
ISBN 10 : 8876424563
ISBN 13 : 9788876424564
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Regularity of Optimal Transport Maps and Applications (Paperback)
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Birkhauser Verlag AG, Pisa, 2013
ISBN 10 : 8876424563
ISBN 13 : 9788876424564
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Paperback. Etat : new. Paperback. In this thesis, we study the regularity of optimal transport maps and its applications to the semi-geostrophic system. The first two chapters survey the known theory, in particular there is a self-contained proof of Brenier theorem on existence of optimal transport maps and of Caffarellis Theorem on Holder continuity of optimal maps. In the third and fourth chapter we start investigating Sobolev regularity of optimal transport maps, while in Chapter 5 we show how the above mentioned results allows to prove the existence of Eulerian solution to the semi-geostrophic equation. In Chapter 6 we prove partial regularity of optimal maps with respect to a generic cost functions (it is well known that in this case global regularity can not be expected). More precisely we show that if the target and source measure have smooth densities the optimal map is always smooth outside a closed set of measure zero. In this thesis, we study the regularity of optimal transport maps and its applications to the semi-geostrophic system. The first two chapters survey the known theory, in particular there is a self-contained proof of Brenier theorem on existence of optimal transport maps and of Caffarellis Theorem on Holder continuity of optimal maps. Shipping may be from multiple locations in the US or from the UK, depending on stock availability. N° de réf. du vendeur 9788876424564
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Regularity of Optimal Transport Maps and Applications
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Edizioni della Normale, 2013
ISBN 10 : 8876424563
ISBN 13 : 9788876424564
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Regularity of Optimal Transport Maps and Applications
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Regularity of Optimal Transport Maps and Applications: 17 (Publications of the Scuola Normale Superiore, 17)
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Regularity of Optimal Transport Maps and Applications
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Regularity of Optimal Transport Maps and Applications: 17 (Publications of the Scuola Normale Superiore, 17)
Edité par
Edizioni della Normale, 2013
ISBN 10 : 8876424563
ISBN 13 : 9788876424564
Neuf
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Regularity of Optimal Transport Maps and Applications (Paperback)
Edité par
Birkhauser Verlag AG, Pisa, 2013
ISBN 10 : 8876424563
ISBN 13 : 9788876424564
Neuf
Paperback
Vendeur : AussieBookSeller, Truganina, VIC, Australie
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Paperback. Etat : new. Paperback. In this thesis, we study the regularity of optimal transport maps and its applications to the semi-geostrophic system. The first two chapters survey the known theory, in particular there is a self-contained proof of Brenier theorem on existence of optimal transport maps and of Caffarellis Theorem on Holder continuity of optimal maps. In the third and fourth chapter we start investigating Sobolev regularity of optimal transport maps, while in Chapter 5 we show how the above mentioned results allows to prove the existence of Eulerian solution to the semi-geostrophic equation. In Chapter 6 we prove partial regularity of optimal maps with respect to a generic cost functions (it is well known that in this case global regularity can not be expected). More precisely we show that if the target and source measure have smooth densities the optimal map is always smooth outside a closed set of measure zero. In this thesis, we study the regularity of optimal transport maps and its applications to the semi-geostrophic system. The first two chapters survey the known theory, in particular there is a self-contained proof of Brenier theorem on existence of optimal transport maps and of Caffarellis Theorem on Holder continuity of optimal maps. Shipping may be from our Sydney, NSW warehouse or from our UK or US warehouse, depending on stock availability. N° de réf. du vendeur 9788876424564
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Regularity of Optimal Transport Maps and Applications
Edité par
Scuola Normale Superiore, 2013
ISBN 10 : 8876424563
ISBN 13 : 9788876424564
Neuf
Couverture souple
Vendeur : moluna, Greven, Allemagne
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Etat : New. Essentially self-contained account of the known regularity theory of optimal maps in the case of quadratic cost Presents proofs of some recent results like Sobolev regularity and Sobolev stability for optimal maps and their applications too the se. N° de réf. du vendeur 103018466
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Regularity of Optimal Transport Maps and Applications
Edité par
Scuola Normale Superiore Sep 2013, 2013
ISBN 10 : 8876424563
ISBN 13 : 9788876424564
Neuf
Taschenbuch
Vendeur : AHA-BUCH GmbH, Einbeck, Allemagne
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Taschenbuch. Etat : Neu. Neuware - In this thesis, we study the regularity of optimal transport maps and its applications to the semi-geostrophic system. The first two chapters survey the known theory, in particular there is a self-contained proof of Brenier' theorem on existence of optimal transport maps and of Caffarelli's Theorem on Holder continuity of optimal maps. In the third and fourth chapter we start investigating Sobolev regularity of optimal transport maps, while in Chapter 5 we show how the above mentioned results allows to prove the existence of Eulerian solution to the semi-geostrophic equation. In Chapter 6 we prove partial regularity of optimal maps with respect to a generic cost functions (it is well known that in this case global regularity can not be expected). More precisely we show that if the target and source measure have smooth densities the optimal map is always smooth outside a closed set of measure zero. N° de réf. du vendeur 9788876424564
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