Strichartz Estimates And The Cauchy Problem For The Gravity Water Waves Equations

Strichartz Estimates and the Cauchy Problem for the Gravity Water Waves Equations

Author : T. Alazard

Publisher : American Mathematical Soc.

Page : 120 pages

File Size : 26,93 MB

Release : 2019-01-08

Category : Mathematics

ISBN : 147043203X

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Book Description

This memoir is devoted to the proof of a well-posedness result for the gravity water waves equations, in arbitrary dimension and in fluid domains with general bottoms, when the initial velocity field is not necessarily Lipschitz. Moreover, for two-dimensional waves, the authors consider solutions such that the curvature of the initial free surface does not belong to L2. The proof is entirely based on the Eulerian formulation of the water waves equations, using microlocal analysis to obtain sharp Sobolev and Hölder estimates. The authors first prove tame estimates in Sobolev spaces depending linearly on Hölder norms and then use the dispersive properties of the water-waves system, namely Strichartz estimates, to control these Hölder norms.





Mathematics of Wave Phenomena

Author : Willy Dörfler

Publisher : Springer Nature

Page : 330 pages

File Size : 30,74 MB

Release : 2020-10-01

Category : Mathematics

ISBN : 3030471748

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Book Description

Wave phenomena are ubiquitous in nature. Their mathematical modeling, simulation and analysis lead to fascinating and challenging problems in both analysis and numerical mathematics. These challenges and their impact on significant applications have inspired major results and methods about wave-type equations in both fields of mathematics. The Conference on Mathematics of Wave Phenomena 2018 held in Karlsruhe, Germany, was devoted to these topics and attracted internationally renowned experts from a broad range of fields. These conference proceedings present new ideas, results, and techniques from this exciting research area.



Lectures on the Theory of Water Waves

Author : Thomas J. Bridges

Publisher : Cambridge University Press

Page : 299 pages

File Size : 32,29 MB

Release : 2016-02-04

Category : Science

ISBN : 1316558940

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Book Description

In the summer of 2014 leading experts in the theory of water waves gathered at the Newton Institute for Mathematical Sciences in Cambridge for four weeks of research interaction. A cross-section of those experts was invited to give introductory-level talks on active topics. This book is a compilation of those talks and illustrates the diversity, intensity, and progress of current research in this area. The key themes that emerge are numerical methods for analysis, stability and simulation of water waves, transform methods, rigorous analysis of model equations, three-dimensionality of water waves, variational principles, shallow water hydrodynamics, the role of deterministic and random bottom topography, and modulation equations. This book is an ideal introduction for PhD students and researchers looking for a research project. It may also be used as a supplementary text for advanced courses in mathematics or fluid dynamics.





Local Well-Posedness and Break-Down Criterion of the Incompressible Euler Equations with Free Boundary

Author : Chao Wang

Publisher : American Mathematical Soc.

Page : 119 pages

File Size : 25,16 MB

Release : 2021-07-21

Category : Education

ISBN : 1470446898

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Book Description

In this paper, we prove the local well-posedness of the free boundary problem for the incompressible Euler equations in low regularity Sobolev spaces, in which the velocity is a Lipschitz function and the free surface belongs to C 3 2 +ε. Moreover, we also present a Beale-Kato-Majda type break-down criterion of smooth solution in terms of the mean curvature of the free surface, the gradient of the velocity and Taylor sign condition.



Global Regularity for 2D Water Waves with Surface Tension

Author : Alexandru D. Ionescu

Publisher : American Mathematical Soc.

Page : 136 pages

File Size : 33,71 MB

Release : 2019-01-08

Category : Mathematics

ISBN : 1470431033

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Book Description

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.



Time Changes of the Brownian Motion: Poincaré Inequality, Heat Kernel Estimate and Protodistance

Author : Jun Kigami

Publisher : American Mathematical Soc.

Page : 130 pages

File Size : 45,22 MB

Release : 2019-06-10

Category : Mathematics

ISBN : 1470436205

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Book Description

In this paper, time changes of the Brownian motions on generalized Sierpinski carpets including n-dimensional cube [0,1]n are studied. Intuitively time change corresponds to alteration to density of the medium where the heat flows. In case of the Brownian motion on [0,1]n, density of the medium is homogeneous and represented by the Lebesgue measure. The author's study includes densities which are singular to the homogeneous one. He establishes a rich class of measures called measures having weak exponential decay. This class contains measures which are singular to the homogeneous one such as Liouville measures on [0,1]2 and self-similar measures. The author shows the existence of time changed process and associated jointly continuous heat kernel for this class of measures. Furthermore, he obtains diagonal lower and upper estimates of the heat kernel as time tends to 0. In particular, to express the principal part of the lower diagonal heat kernel estimate, he introduces “protodistance” associated with the density as a substitute of ordinary metric. If the density has the volume doubling property with respect to the Euclidean metric, the protodistance is shown to produce metrics under which upper off-diagonal sub-Gaussian heat kernel estimate and lower near diagonal heat kernel estimate will be shown.



On Space-Time Quasiconcave Solutions of the Heat Equation

Author : Chuanqiang Chen

Publisher : American Mathematical Soc.

Page : 94 pages

File Size : 16,5 MB

Release : 2019-06-10

Category : Mathematics

ISBN : 1470435241

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Book Description

In this paper the authors first obtain a constant rank theorem for the second fundamental form of the space-time level sets of a space-time quasiconcave solution of the heat equation. Utilizing this constant rank theorem, they obtain some strictly convexity results of the spatial and space-time level sets of the space-time quasiconcave solution of the heat equation in a convex ring. To explain their ideas and for completeness, the authors also review the constant rank theorem technique for the space-time Hessian of space-time convex solution of heat equation and for the second fundamental form of the convex level sets for harmonic function.



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

Author : Oliver Lorscheid

Publisher : American Mathematical Soc.

Page : 90 pages

File Size : 28,54 MB

Release : 2019-12-02

Category : Education

ISBN : 1470436477

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Book Description

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.