Global Regularity for 2D Water Waves with Surface Tension

Global Regularity for 2D Water Waves with Surface Tension
Title Global Regularity for 2D Water Waves with Surface Tension PDF eBook
Author Alexandru D. Ionescu
Publisher American Mathematical Soc.
Pages 136
Release 2019-01-08
Genre Mathematics
ISBN 1470431033

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The authors consider the full irrotational water waves system with surface tension and no gravity in dimension two (the capillary waves system), and prove global regularity and modified scattering for suitably small and localized perturbations of a flat interface. An important point of the authors' analysis is to develop a sufficiently robust method (the “quasilinear I-method”) which allows the authors to deal with strong singularities arising from time resonances in the applications of the normal form method (the so-called “division problem”). As a result, they are able to consider a suitable class of perturbations with finite energy, but no other momentum conditions. Part of the authors' analysis relies on a new treatment of the Dirichlet-Neumann operator in dimension two which is of independent interest. As a consequence, the results in this paper are self-contained.

Global Regularity for 2D Water Waves with Surface Tension

Global Regularity for 2D Water Waves with Surface Tension
Title Global Regularity for 2D Water Waves with Surface Tension PDF eBook
Author Alexandru Dan Ionescu
Publisher
Pages
Release 2018
Genre
ISBN 9781470449179

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Almost Global Solutions of Capillary-Gravity Water Waves Equations on the Circle

Almost Global Solutions of Capillary-Gravity Water Waves Equations on the Circle
Title Almost Global Solutions of Capillary-Gravity Water Waves Equations on the Circle PDF eBook
Author Massimiliano Berti
Publisher Springer
Pages 276
Release 2018-11-02
Genre Mathematics
ISBN 3319994867

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The goal of this monograph is to prove that any solution of the Cauchy problem for the capillary-gravity water waves equations, in one space dimension, with periodic, even in space, small and smooth enough initial data, is almost globally defined in time on Sobolev spaces, provided the gravity-capillarity parameters are taken outside an exceptional subset of zero measure. In contrast to the many results known for these equations on the real line, with decaying Cauchy data, one cannot make use of dispersive properties of the linear flow. Instead, a normal forms-based procedure is used, eliminating those contributions to the Sobolev energy that are of lower degree of homogeneity in the solution. Since the water waves equations form a quasi-linear system, the usual normal forms approaches would face the well-known problem of losses of derivatives in the unbounded transformations. To overcome this, after a paralinearization of the capillary-gravity water waves equations, we perform several paradifferential reductions to obtain a diagonal system with constant coefficient symbols, up to smoothing remainders. Then we start with a normal form procedure where the small divisors are compensated by the previous paradifferential regularization. The reversible structure of the water waves equations, and the fact that we seek solutions even in space, guarantees a key cancellation which prevents the growth of the Sobolev norms of the solutions.

Free Boundary Problems in Fluid Dynamics

Free Boundary Problems in Fluid Dynamics
Title Free Boundary Problems in Fluid Dynamics PDF eBook
Author Albert Ai
Publisher Springer Nature
Pages 373
Release
Genre
ISBN 3031604520

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Quasi-Periodic Traveling Waves on an Infinitely Deep Perfect Fluid Under Gravity

Quasi-Periodic Traveling Waves on an Infinitely Deep Perfect Fluid Under Gravity
Title Quasi-Periodic Traveling Waves on an Infinitely Deep Perfect Fluid Under Gravity PDF eBook
Author Roberto Feola
Publisher American Mathematical Society
Pages 170
Release 2024-04-17
Genre Mathematics
ISBN 1470468778

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The Einstein-Klein-Gordon Coupled System

The Einstein-Klein-Gordon Coupled System
Title The Einstein-Klein-Gordon Coupled System PDF eBook
Author Alexandru D. Ionescu
Publisher Princeton University Press
Pages 308
Release 2022-03-15
Genre Science
ISBN 0691233039

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A definitive proof of global nonlinear stability of Minkowski space-time as a solution of the Einstein-Klein-Gordon equations This book provides a definitive proof of global nonlinear stability of Minkowski space-time as a solution of the Einstein-Klein-Gordon equations of general relativity. Along the way, a novel robust analytical framework is developed, which extends to more general matter models. Alexandru Ionescu and Benoît Pausader prove global regularity at an appropriate level of generality of the initial data, and then prove several important asymptotic properties of the resulting space-time, such as future geodesic completeness, peeling estimates of the Riemann curvature tensor, conservation laws for the ADM tensor, and Bondi energy identities and inequalities. The book is self-contained, providing complete proofs and precise statements, which develop a refined theory for solutions of quasilinear Klein-Gordon and wave equations, including novel linear and bilinear estimates. Only mild decay assumptions are made on the scalar field and the initial metric is allowed to have nonisotropic decay consistent with the positive mass theorem. The framework incorporates analysis both in physical and Fourier space, and is compatible with previous results on other physical models such as water waves and plasma physics.

Quiver Grassmannians of Extended Dynkin Type D Part I: Schubert Systems and Decompositions into Affine Spaces

Quiver Grassmannians of Extended Dynkin Type D Part I: Schubert Systems and Decompositions into Affine Spaces
Title Quiver Grassmannians of Extended Dynkin Type D Part I: Schubert Systems and Decompositions into Affine Spaces PDF eBook
Author Oliver Lorscheid
Publisher American Mathematical Soc.
Pages 90
Release 2019-12-02
Genre Education
ISBN 1470436477

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Let Q be a quiver of extended Dynkin type D˜n. In this first of two papers, the authors show that the quiver Grassmannian Gre–(M) has a decomposition into affine spaces for every dimension vector e– and every indecomposable representation M of defect −1 and defect 0, with the exception of the non-Schurian representations in homogeneous tubes. The authors characterize the affine spaces in terms of the combinatorics of a fixed coefficient quiver for M. The method of proof is to exhibit explicit equations for the Schubert cells of Gre–(M) and to solve this system of equations successively in linear terms. This leads to an intricate combinatorial problem, for whose solution the authors develop the theory of Schubert systems. In Part 2 of this pair of papers, they extend the result of this paper to all indecomposable representations M of Q and determine explicit formulae for the F-polynomial of M.