![]() ![]() ![]() Shop all of our caps with our Sezzle payment method to buy now and pay later, or sign up for our Rewards Program to save even more! Frequently Asked Questions 1. With our sophisticated styles, you’ll always look and feel your best. When you shop quality, it just feels right. You can play with style and functionality when you flip your cap in any direction to change the vibe and energy of your ensemble! Ann.If you’re looking for a hat that’s flattering and easy to wear, ivy cap is a great choice. 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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