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Remarks on k-Leviflat Complex Manifolds

Published online by Cambridge University Press:  20 November 2018

B. Gilligan  and
A. Huckleberry
B. Gilligan
Affiliation:
University of Regina, Regina, Saskatchewan
A. Huckleberry
Affiliation:
University of Notre Dame, Notre Dame, Indiana
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In the theory of functions of several complex variables one is naturally led to study non-compact complex manifolds which have certain types of exhaustions. For example, on a Stein manifold X there is a strictly plurisubharmonic function ϕ: X → R+ so that the pseudoballs Bc = {φ < c } exhaust X. Conversely, a manifold which has such an exhaustion is Stein. The purpose of this note is to study a class of manifolds which have exhaustions along the lines of those on holomorphically convex manifolds, namely the k-Leviflat complex manifolds. Unlike the Stein case, the Levi form may have positive dimensional 0-eigenspaces. In the holomorphically convex case these are tangent to the generic fiber of the Remmert reduction.

Type
Research Article
Information
Canadian Journal of Mathematics , Volume 31 , Issue 4 , 01 August 1979 , pp. 881 - 889
Copyright
Copyright © Canadian Mathematical Society 1979

References

1. Diederich, K. and Fornaess, J. E., Pseudoconvex domains: Bounded strictly plurisubharmonic exhaustion functions, Inv. Math. 89 (2) (1977), 129141.Google Scholar
2. Freeman, M., Local complex foliations of real submanifolds, Math. Ann. 209 (1974), 130.Google Scholar
3. Gilligan, B. and Huckleberry, A., On non-compact complex nil-manifolds , (to appear).Google Scholar
4. Grauert, H., On Levi s problem and the imbedding of real-analytic manifolds, Ann. Math. 68 (1958), 460472.Google Scholar
5. Grauert, H., Die Bedeutung des Levischen Problems fur die analytische und algebraische Géométrie, Pro. Int. Cong. Math. Stockholm (1962), 86101.Google Scholar
6. Green, M., Holomorphic maps into complex tori , (to appear in Amer. J. of Math.)Google Scholar
7. Huckleberry, A., The Levi problem on pseudoconvex manifolds which are not strongly pseudoconvex, Math. Ann. 219 (1976), 127137.Google Scholar
8. Huckleberry, A., Holomorphic fibrations of bounded domains, Math. Ann. 227 (1977), 6166.Google Scholar
9. Huckleberry, A. and Nirenberg, R., On k-pseudoflat complex spaces, Math. Ann. 200 (1973), 110.Google Scholar
10. Kazama, H., On pseudoconvexity of complex abelian Lie groups, J. Math. Soc. Japan, 25 (2) (1973), 329333.Google Scholar
11. Kobayashi, S., Hyperbolic manifolds and holomorphic mappings (Marcel Dekker, Inc., New York, 1970).Google Scholar
12. Matsushima, Y., On the discrete subgroups and homogeneous spaces of nilpotent Lie groups, Nagoya Math. J. 2 (1951), 95110.Google Scholar
13. Morimoto, A., Non-compact complex Lie groups without non-constant holomorphic functions, Proceedings of the Conference on Complex Analysis, Minneapolis (1964), 256272.Google Scholar
14. Stein, K., Analytische Zerlegungen komplexer Rdmne, Math. Ann. 182 (1956), 6393.Google Scholar