Preface.- The water-waves equations: from Zakharov to Euler.- On the characterization of pseudodifferential operators (old and new).- Improved multipolar Hardy inequalities.- The role of spectral anisotropy in the resolution of the three-dimensional Navier-Stokes equations.- Schrödinger equations in modulation spaces.- New maximal regularity results for the heat equation in exterior domains, and applications.- Cauchy problem for some 22 hyperbolic systems of pseudo-differential equations with nondiagonalisable principal part.- Scattering problem for quadratic nonlinear Klein-Gordon equation in 2d.- Global solutions to the 3-D incompressible inhomogeneous Navier-Stokes system with rough density.- The Cauchy problem for the Euler-Poisson system and derivation of the Zakharov-Kuznetsov equation.- L1 estimates for oscillating integrals related to structural damped wave models.- On the Cauchy problem for noneffectively hyperbolic operators, a transition case.- References.
This collection of original articles and surveys, emerging from a 2011 conference in Bertinoro, Italy, addresses recent advances in linear and nonlinear aspects of the theory of partial differential equations (PDEs). Phase space analysis methods, also known as microlocal analysis, have continued to yield striking results over the past years and are now one of the main tools of investigation of PDEs. Their role in many applications to physics, including quantum and spectral theory, is equally important.
Key topics addressed in this volume include:
*general theory of pseudodifferential operators
*linear and non-linear hyperbolic equations and systems
*heat and parabolic equations
Various levels of graduate students, along with researchers in PDEs and related fields, will find this book to be an excellent resource.
T. Alazard P.I. Naumkin
J.-M. Bony F. Nicola
N. Burq T. Nishitani
C. Cazacu T. Okaji
J.-Y. Chemin M. Paicu
E. Cordero A. Parmeggiani
R. Danchin V. Petkov
I. Gallagher M. Reissig
T. Gramchev L. Robbiano
N. Hayashi L. Rodino
J. Huang M. Ruzhanky <
Provides both surveys and recent advances in phase space analysis for PDEs
Distinguished mathematicians address current work of importance
Encompasses applications to a wide range of areas in mathematics and physics