Topics in Nonlinear Analysis: The Herbert Amann Anniversary VolumeJoachim Escher, Gieri Simonett Springer Science & Business Media, 1 nov. 1998 - 748 pages Herbert Amann's work is distinguished and marked by great lucidity and deep mathematical understanding. The present collection of 31 research papers, written by highly distinguished and accomplished mathematicians, reflect his interest and lasting influence in various fields of analysis such as degree and fixed point theory, nonlinear elliptic boundary value problems, abstract evolutions equations, quasi-linear parabolic systems, fluid dynamics, Fourier analysis, and the theory of function spaces. Contributors are A. Ambrosetti, S. Angenent, W. Arendt, M. Badiale, T. Bartsch, Ph. Bénilan, Ph. Clément, E. Faöangová, M. Fila, D. de Figueiredo, G. Gripenberg, G. Da Prato, E.N. Dancer, D. Daners, E. DiBenedetto, D.J. Diller, J. Escher, G.P. Galdi, Y. Giga, T. Hagen, D.D. Hai, M. Hieber, H. Hofer, C. Imbusch, K. Ito, P. Krejcí, S.-O. Londen, A. Lunardi, T. Miyakawa, P. Quittner, J. Prüss, V.V. Pukhnachov, P.J. Rabier, P.H. Rabinowitz, M. Renardy, B. Scarpellini, B.J. Schmitt, K. Schmitt, G. Simonett, H. Sohr, V.A. Solonnikov, J. Sprekels, M. Struwe, H. Triebel, W. von Wahl, M. Wiegner, K. Wysocki, E. Zehnder and S. Zheng. |
Table des matières
II | 1 |
III | 11 |
IV | 29 |
V | 51 |
VI | 69 |
VII | 83 |
VIII | 101 |
IX | 117 |
XVIII | 357 |
XIX | 375 |
XX | 471 |
XXI | 493 |
XXII | 511 |
XXIII | 529 |
XXVI | 547 |
XXVII | 565 |
X | 143 |
XI | 183 |
XII | 213 |
XIII | 251 |
XIV | 273 |
XV | 305 |
XVI | 321 |
XVII | 345 |
XXVIII | 579 |
XXIX | 605 |
XXX | 613 |
XXXI | 635 |
XXXII | 665 |
XXXIII | 683 |
XXXIV | 723 |
Autres éditions - Tout afficher
Topics in Nonlinear Analysis: The Herbert Amann Anniversary Volume Herbert Amann,Joachim Escher,Gieri Simonett Affichage d'extraits - 1999 |
Expressions et termes fréquents
Amann apply argument assume assumption asymptotic Banach space bifurcation Birkhäuser boundary conditions boundary value problems bounded bundle Co(N compact complex structure consider continuous converges Corollary curve defined denote derivative Differential Equations Dirichlet dom(A domain E₁ eigenvalue elliptic elliptic operators embedding estimate exists finite energy surface follows Fredholm Fredholm operator function given Hence Hilbert space Hölder holds holomorphic implies inequality integral interpolation L²(N Lemma linear Math mean curvature Moreover Navier-Stokes Navier-Stokes equations non-degenerate nonlinear norm obtain operator parabolic proof of Theorem properties Proposition prove pseudoholomorphic curve recall Reeb vector field Remark respect result satisfies Section semigroup sequence smooth Sobolev Sobolev spaces subset Suppose Theorem 2.1 theory u₁ uniformly unique solution weak solution zero