00921nam0 2200301 450 991074269010332120230926180046.0978880623113220230926d2020----km y0itay50 baitaIT 001yyNel groviglio degli anni ottantapolitica e illusioni di una generazione nata troppo tardiAdolfo Scotto di LuzioTorinoEinaudi2020VII, 303 p.24 cmStoria892001GiovaniCulturaItalia1980-1990GiovaniRapporti con la Politica1980-1990305.24222itaScotto Di Luzio,Adolfo168167ITUNINAREICATUNIMARCBK9910742690103321305.242 SCO 110534BFSBFSNel groviglio degli anni Ottanta1769393UNINA02715oam 2200649 n 450 991027504500332120231128130047.02-87854-775-62-87854-770-5(CKB)4100000003667370(FrMaCLE)OB-psn-2560(PPN)225782138(EXLCZ)99410000000366737020180314j|||||||| ||| 0freur||||||m||||Médiations ou le métier de germanisteHommage à Pierre BertauxGilbert Krebs, Hansgerd Schulte, Gerald StiegParisPresses Sorbonne Nouvelle20172-87854-926-0 Ce volume est à la fois un hommage, un témoignage et un manifeste. Il a été réalisé à l'occasion du 70e anniversaire de Pierre Bertaux, dont les écrits et les actions ont illustré pendant plusieurs décennies les études germaniques en France et ont joué un rôle de premier plan dans l'évolution de la discipline. En même temps c'est un témoignage vivant de cette influence : oeuvre collective de l'équipe de germanistes que Pierre Bertaux a réunie autour de lui à l'Institut d'Allemand d'Asnières à partir de 1969, il en démontre à la fois la diversité et la vitalité.Médiations ou le métier de germanisteLiterature German Dutch ScandinaviangermanistePierre BertauxmédiateurLiterature German Dutch ScandinaviangermanistePierre BertauxmédiateurBetz Albrecht203582Buguet Antoine1326527Carstanjen Eva1285942Guillard Gilbert1285944Hoock Marie-Claire1326528Hörling Hans1326529Kauffmann Michel1285959Krebs Gilbert1233388Laitenberger‑Wegener Heide1326530Lasserre René1240591Quiguer Claude456335Racine Jean172984Schlaffer Hannelore385297Schuffels Klaus1326531Schulte Hansgerd132698Schumacher Alois246840Schumacher Horst1326532Stieg Gerald156336Tournadre Jean‑François1293484Vaydat Pierre1293599Wenger Klaus1326533Witte Bernd156294Zemb Jean-Marie313175FR-FrMaCLEBOOK9910275045003321Médiations ou le métier de germaniste3386048UNINA03336nam 2200865z- 450 991037278680332120231214133627.03-03928-001-5(CKB)4100000010163758(oapen)https://directory.doabooks.org/handle/20.500.12854/48494(EXLCZ)99410000001016375820202102d2020 |y 0engurmn|---annantxtrdacontentcrdamediacrrdacarrierGeometry of Submanifolds and Homogeneous SpacesMDPI - Multidisciplinary Digital Publishing Institute20201 electronic resource (128 p.)3-03928-000-7 The present Special Issue of Symmetry is devoted to two important areas of global Riemannian geometry, namely submanifold theory and the geometry of Lie groups and homogeneous spaces. Submanifold theory originated from the classical geometry of curves and surfaces. Homogeneous spaces are manifolds that admit a transitive Lie group action, historically related to F. Klein's Erlangen Program and S. Lie's idea to use continuous symmetries in studying differential equations. In this Special Issue, we provide a collection of papers that not only reflect some of the latest advancements in both areas, but also highlight relations between them and the use of common techniques. Applications to other areas of mathematics are also considered.warped productsvector equilibrium problemLaplace operatorcost functionalpointwise 1-type spherical Gauss mapinequalitieshomogeneous manifoldfinite-typemagnetic curvesSasaki-Einsteinevolution dynamicsnon-flat complex space formshyperbolic spacecompact Riemannian manifoldsmaximum principlesubmanifold integralClifford torusD’Atri space3-Sasakian manifoldlinksisoparametric hypersurfaceEinstein manifoldreal hypersurfacesKähler 2*-Weyl curvature tensorhomogeneous geodesicoptimal controlformalityhadamard manifoldsSasakian Lorentzian manifoldgeneralized convexityisospectral manifoldsLegendre curvesgeodesic chord propertyspherical Gauss mappointwise bi-slant immersionsmean curvatureweakly efficient pareto pointsgeodesic symmetrieshomogeneous Finsler spaceorbifoldsslant curveshypersphere??-spacek-D’Atri space*-Ricci tensorhomogeneous spaceKaimakamis Georgeauth1293623Arvanitoyeorgos AndreasauthBOOK9910372786803321Geometry of Submanifolds and Homogeneous Spaces3022673UNINA