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Free Boundary Problems in Fluid Dynamics de Albert Ai

Free Boundary Problems in Fluid Dynamics: Oberwolfach Seminars, cartea 54

Autor Albert Ai, Thomas Alazard, Mihaela Ifrim, Daniel Tataru
en Limba Engleză Paperback – 20 iun 2024
This book, originating from a seminar held at Oberwolfach in 2022, introduces to state-of-the-art methods and results in the study of free boundary problems which are arising from compressible as well as from incompressible Euler’s equations in general. A particular set of such problems is given by gaseous stars considered in a vacuum (modeled via the compressible Euler equations) as well as water waves in their full generality (seen as recasts of incompressible irrotational Euler equations). This is a broad research area which is highly relevant to many real life problems, and in which substantial progress has been made in the last decade.
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Specificații

ISBN-13: 9783031604515
ISBN-10: 3031604512
Pagini: 362
Ilustrații: XIV, 362 p. 13 illus., 11 illus. in color.
Dimensiuni: 168 x 240 x 31 mm
Greutate: 0.63 kg
Ediția:2024
Editura: Springer Nature Switzerland
Colecția Birkhäuser
Seria Oberwolfach Seminars

Locul publicării:Cham, Switzerland

Cuprins

- The water-wave equations in Eulerian coordinates.- Strichartz Estimates for Water Waves.- Local and global dynamics for two dimensional gravity water waves.- Free boundary problems for compressible flows.

Notă biografică

Albert Ai is a postdoctoral researcher at the University of Wisconsin-Madison. He received his PhD from the University of California, Berkeley in 2019. His primary research interests include the analysis of nonlinear dispersive PDEs and harmonic analysis. In particular, he has worked on low regularity solutions of fluid models and wave equations.
Thomas Alazard is Director of Research at the CNRS and Associate Professor at the École normale supérieure Paris-Saclay. He received his PhD from the University of Bordeaux, France, in 2005. Previously, he worked at the Orsay mathematics department and at the École normale supérieure in Paris. His research focuses on the analysis of partial differential equations, a subject on which he has written several books.
Mihaela Ifrim is currently a Professor  of Mathematics at the University of Wisconsin, Madison. She studied mathematics in Bucharest and at the University of California, Davis, where she received her Ph.D. in 2012. After a Simons postdoctoral fellowship at UC Berkeley, in 2017 she moved Madison, where she was a Sloan Research Fellow and a CAREER grant recipient. Her work spans many directions in nonlinear partial differential equations, including fluid dynamics and nonlinear dispersive flows, with an emphasis on free boundary problems and on the study of low regularity local and global dynamics of the solutions.
Daniel Tataru is a Distinguished Professor in Mathematics at the University of California, Berkeley.  He is well known for his substantial contributions to dispersive pde's, also in connection to fluid dynamics, harmonic analysis, geometry, general relativity and free boundary problems. He studied mathematics at the University of Iasi, in Romania, and then at University of Virginia, where he received his Ph.D. in 1992. He spent almost a decade at Northwestern university, before moving to Berkeley. Among other honors, he is a Fellow of both the American Academy of Arts and Sciences and the European Academy of Sciences, as well as a Simons Investigator since 2013.

Textul de pe ultima copertă

This book, originating from a seminar held at Oberwolfach in 2022, introduces to state-of-the-art methods and results in the study of free boundary problems which are arising from compressible as well as from incompressible Euler’s equations in general. A particular set of such problems is given by gaseous stars considered in a vacuum (modeled via the compressible Euler equations) as well as water waves in their full generality (seen as recasts of incompressible irrotational Euler equations). This is a broad research area which is highly relevant to many real life problems, and in which substantial progress has been made in the last decade.

Caracteristici

A comprehensive review of water waves In depth discussion of Dirichlet to Neuman map Latest results on free boundary problems for compressible Euler