![]() ![]() ![]() Its current incarnation was founded on January 1, 2002, as the result of a merger among ten cities, including the older city of Lévis founded in 1861. A ferry links Old Quebec with Old Lévis, and two bridges, the Quebec Bridge and the Pierre-Laporte Bridge, connect western Lévis with Quebec City. Ann.Lévis ( French pronunciation: ( listen)) is a city in eastern Quebec, Canada, located on the south shore of the St. Zaffran, D.: Serre problem and Inoue–Hirzebruch surfaces. Takeuchi, A.: Domaines pseudoconvexes infinis et la métrique riemannienne dans un espace projectif. Seke, B.: Sur les structures transversalement affines des feuilletages de codimension un. Scárdua, B.A.: Transversely affine and transversely projective holomorphic foliations. Peternell, Th.: Pseudoconvexity, the Levi Problem and Vanishing Theorems, Several Complex Variables, VII, Encyclopaedia Mathematical and Science, vol. Ohtsuki, M.: A residue formula for Chern classes associated with logarithmic connections. Ohsawa, T.: \(L^2\) Approaches in Several Complex Variables. Ohsawa, T.: On the complement of Levi-flats in Kähler manifolds of dimension \(\ge 3\). Ohsawa, T.: A Stein domain with smooth boundary which has a product structure. Nemirovskiĭ, SYu.: Stein domains with Levi-plane boundaries on compact complex surfaces. Lins Neto, A.: A note on projective Levi flats and minimal sets of algebraic foliations. Ivashkovich, S.: Extension properties of complex analytic objects. Fourier (Grenoble) 67(6), 2423–2462 (2017)Ĭartan, E.: Sur la géométrie pseudo-conforme des hypersurfaces de l’espace de deux variables complexes. 57, 3101–3113 (2008)Ĭanales González, C.: Levi-flat hypersurfaces and their complement in complex surfaces. Academic Press Inc., Boston (1987)īrunella, M.: On the dynamics of codimension one holomorphic foliations with ample normal bundle. 332(1), 459–474 (1992)īorel, A., Grivel, P.-P., Kaup, B., Haefliger, A., Malgrange, B., Ehlers, F.: Algebraic D-Modules, Perspectives in Mathematics, vol. Barrett, D.E.: Global convexity properties of some families of three-dimensional compact Levi-flat hypersurfaces. ![]()
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