Roller, Relative ends and duality groups, J. Blaine Lawson, On boundaries of complex analytic varieties. (1992), 165-246 Zbl0896.58024įritz Hartogs, Zur Theorie der analytischen Funktionen mehrerer unabhängiger Veränderlichen, insbesondere über die Darstellung derselben durch Reihen, welche nach Potenzen einer Veränderlichen fortschreiten, Math. Mikhail Gromov, Richard Schoen, Harmonic maps into singular spaces and p-adic superrigidity for lattices in groups of rank one, Inst. Michel Gromov, Kähler hyperbolicity and L 2-Hodge theory, J.Michel Gromov, Sur le groupe fondamental d’une variété kählérienne, C.in honor of Salomon Bochner, Princeton Univ., Princeton, N.J., 1969) (1970), 61-79, Princeton Univ. Hans Grauert, Oswald Riemenschneider, Kählersche Mannigfaltigkeiten mit hyper- q-konvexem Rand, Problems in analysis (Lectures Sympos.Moses Glasner, Richard Katz, Function-theoretic degeneracy criteria for Riemannian manifolds, Pacific J. Ross Geoghegan, Topological methods in group theory, 243 (2008), Springer, New York Zbl1141.57001.Jean-Pierre Demailly, Estimations L 2 pour l’opérateur ∂ ¯ d’un fibré vectoriel holomorphe semi-positif au-dessus d’une variété kählérienne complète, Ann. Thomas Delzant, Misha Gromov, Cuts in Kähler groups, Infinite groups: geometric, combinatorial and dynamical aspects 248 (2005), 31-55, Birkhäuser, Basel Zbl1116.32016.Cousin, Sur les fonctions triplement périodiques de deux variables, Acta Math. Yau, Differential equations on Riemannian manifolds and their geometric applications, Comm. (2) 44 (1943), 652-673 Zbl0060.24206įrédéric Campana, Remarques sur le revêtement universel des variétés kählériennes compactes, Bull. Bochner, Analytic and meromorphic continuation by means of Green’s formula, Ann. Ramachandran, On the fundamental group of a compact Kähler manifold, Duke Math. Toledo, Fundamental groups of compact Kähler manifolds, 44 (1996), American Mathematical Society, Providence, RI Zbl0849.32006Īldo Andreotti, Edoardo Vesentini, Carleman estimates for the Laplace-Beltrami equation on complex manifolds, Inst.
0 Comments
Leave a Reply. |
AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |