Optimal mass transport has emerged in the past three decades as an active field with wide-ranging connections to the calculus of variations, PDEs, and geometric analysis. This graduate-level introduction covers the field's theoretical foundation and key ideas in applications. By focusing on optimal mass transport problems in a Euclidean setting, the book is able to introduce concepts in a gradual, accessible way with minimal prerequisites, while remaining technically and conceptually complete. Working in a familiar context will help readers build geometric intuition quickly and give them a strong foundation in the subject. This book explores the relation between the Monge and Kantorovich transport problems, solving the former for both the linear transport cost (which is important in geometric applications) and for the quadratic transport cost (which is central in PDE applications), starting from the solution of the latter for arbitrary transport costs.
Author: Francesco Maggi
Binding Type: Hardcover
Publisher: Cambridge University Press
Published: 11/16/2023
Series: Cambridge Studies in Advanced Mathematics #207
Pages: 345
Weight: 1.4lbs
Size: 9.00h x 6.00w x 0.88d
ISBN: 9781009179706
Ezra's Archive Does not ship outside of the United States
Delivery Options:
1. Economy:
Estimated Delivery Time - 5 to 8 Business Days
Shipping Cost - $4.15
2. USPS Priority:
Estimated Delivery Time - 1 to 3 Business Days
Shipping Cost - $8.85
3. Free Economy Shipping: Only Applicable to Orders over $60
Returns and Refunds:
Purchased items are not eligible to be returned. However, a refund or item replacement may be granted should an item be damaged or misplaced during shipping. To make a refund or replacement claim please contact us via email at Ezra'sArchive@outlook.com