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Artykuły w czasopismach na temat "Espace symétrique Riemannien"
Daher, Radouan. "Résolubilité sur un espace riemannien symétrique". Bulletin de la Société mathématique de France 127, nr 3 (1999): 349–62. http://dx.doi.org/10.24033/bsmf.2352.
Pełny tekst źródłaVEROVIC, PATRICK. "Problème de l'entropie minimale pour les métriques de Finsler". Ergodic Theory and Dynamical Systems 19, nr 6 (grudzień 1999): 1637–54. http://dx.doi.org/10.1017/s0143385799151952.
Pełny tekst źródłaHassani, Ali. "Équation des ondes sur les espaces symétriques riemanniens". Comptes Rendus Mathematique 347, nr 13-14 (lipiec 2009): 725–28. http://dx.doi.org/10.1016/j.crma.2009.04.031.
Pełny tekst źródłaRozprawy doktorskie na temat "Espace symétrique Riemannien"
Daher, Radouan. "Analyse sur un espace riemannien symétrique". Nice, 1989. http://www.theses.fr/1989NICE4263.
Pełny tekst źródłaRoby, Simon. "Résonances du Laplacien sur les fibrés vectoriels homogènes sur des espaces symétriques de rang réel un". Electronic Thesis or Diss., Université de Lorraine, 2021. http://www.theses.fr/2021LORR0129.
Pełny tekst źródłaWe study the resonances of the Laplacian acting on the compactly supported sections of a homogeneous vector bundle over a Riemannian symmetric space of the non- compact type. The symmetric space is assumed to have rank-one but the irreducible representation τ of the maximal compact K defining the vector bundle is arbitrary. We determine the resonances. Under the additional assumption that τ occurs in the spherical principal series, we determine the resonance representations. They are all irreducible. We find their Langlands parameters, their wave front sets and determine which of them are unitarizable
Hassani, Ali. "ÉQUATION DES ONDES SUR LES ESPACES SYMÉTRIQUES RIEMANNIENS DE TYPE NON COMPACT". Phd thesis, Université de Nanterre - Paris X, 2011. http://tel.archives-ouvertes.fr/tel-00669082.
Pełny tekst źródłaFranc, Annik. "Structures de spin et opérateur de Dirac sur les espaces riemanniens symétriques compacts simplement connexes". Doctoral thesis, Universite Libre de Bruxelles, 1989. http://hdl.handle.net/2013/ULB-DIPOT:oai:dipot.ulb.ac.be:2013/213245.
Pełny tekst źródłaCarvajales, Goyetche Leon Seibal. "Quantitative aspects of Anosov subgroups acting on symmetric spaces". Thesis, Sorbonne université, 2020. http://www.theses.fr/2020SORUS021.
Pełny tekst źródłaThis thesis addresses the study of the orbital counting problem for pseudo-Riemannian symmetric pairs under the action of Anosov subgroups of the underlying Lie group. In the first part we study this problem for the pair (PSO(p,q), PSO(p,q−1)) and a projective Anosov subgroup of PSO(p,q). We look at the orbit of a geodesic copy of the Riemannian symmetric space of PSO(p,q−1) inside the Riemannian symmetric space of PSO(p,q). We show a purely exponential asymptotic behavior, as t goes to infinity, for the number of elements in this orbit which are at distance at most t from the original geodesic copy. We then interpret this result as the asymptotic behavior of the amount of space-like geodesic segments (in the pseudo-Riemannian hyperbolic space) of maximum length t in the orbit of a basepoint. We prove analogue results for other related counting functions. In the second part we look at the pair (PSL(d,R), PSO(p,d−p)) and a Borel-Anosov subgroup of PSL(d,R), presenting contributions towards the understanding of the asymptotic behavior of the counting function associated to a geodesic copy of the Riemannian symmetric space of PSO(p,d-p) inside the Riemannian symmetric space of PSL(d,R)
Schäfer, Lars. "Geometrie tt* et applications pluriharmoniques". Nancy 1, 2006. http://www.theses.fr/2006NAN10041.
Pełny tekst źródłaIn this work we introduce the real differential geometric notion of a tt*-bundle (E,D,S), a metric tt*-bundle (E,D,S,g) and a symplectic tt*-bundle (E,D,S,omega) on an abstract vector bundle E over an almost complex manifold (M,J). With this notion we construct, generalizing Dubrovin, a correspondence between metric tt*-bundles over complex manifolds (M,J) and admissible pluriharmonic maps from (M,J) into the pseudo-Riemannian symmetric space GL(r,R)/O(p,q) where (p,q) is the signature of the metric g. Moreover, we show a rigidity result for tt*-bundles over compact Kähler manifolds and we obtain as application a special case of Lu's theorem. In addition we study solutions of tt*-bundles (TM,D,S) on the tangent bundle TM of (M,J) and characterize an interesting class of these solutions which contains special complex manifolds and flat nearly Kähler manifolds. We analyze which elements of this class admit metric or symplectic tt*-bundles. Further we consider solutions coming from varitations of Hodge structures (VHS) and harmonic bundles. Applying our correspondence to harmonic bundles we generalize a correspondence given by Simpson. Analyzing the associated pluriharmonic maps we obtain roughly speaking for special Kähler manifolds the dual Gauss map and for VHS of odd weight the period map. In the case of non-integrable complex structures, we need to generalize the notions of pluriharmonic maps and some results. Apart from the rigidity result we generalize all above results to para-complex geometry
Butruille, Jean-Baptiste. "Variétés de Gray et géométries spéciales en dimension 6". Phd thesis, Ecole Polytechnique X, 2005. http://tel.archives-ouvertes.fr/tel-00118939.
Pełny tekst źródłaOstellari, Patrick. "Estimations globales du noyau de la chaleur". Phd thesis, Université Henri Poincaré - Nancy I, 2003. http://tel.archives-ouvertes.fr/tel-00004080.
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