Proceedings of the Conference on Complex AnalysisA. Aeppli, E. Calabi, H. Röhrl This volume contains the articles contributed to the Minnesota Con ference on Complex Analysis (COCA). The Conference was held March 16-21, 1964, at the University of Minnesota, under the sponsorship of the U. S. Air Force Office of Scientific Research with thirty-one invited participants attending. Of these, nineteen presented their papers in person in the form of one-hour lectures. In addition, this volume con tains papers contributed by other attending participants as well as by participants who, after having planned to attend, were unable to do so. The list of particip ants, as well as the contributions to these Proceed ings, clearly do not represent a complete coverage of the activities in all fields of complex analysis. It is hoped, however, that these limitations stemming from the partly deliberate selections will allow a fairly com prehensive account of the current research in some of those areas of complex analysis that, in the editors' belief, have rapidly developed during the past decade and may remain as active in the foreseeable future as they are at the present time. In conclusion, the editors wish to thank, first of all, the participants and contributors to these Proceedings for their enthusiastic cooperation and encouragement. Our thanks are due also to the University of Min nesota, for offering the physical facilities for the Conference, and to Springer-Verlag for publishing these proceedings. |
Contents
On Factorization of Holomorphic Mappings | 1 |
Cauchy Integral Formulas and Boundary Kernel Functions | 5 |
Extrinsic Complex Projective Geometry With 1 Figure | 18 |
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Proceedings of the Conference on Complex Analysis A. Aeppli,E. Calabi,H. Röhrl No preview available - 2012 |
Common terms and phrases
algebra analytic space analytic subset assume Banach space boundary bounded bundle called choose closed cohomology compact complex analytic complex manifold complex space component condition connected consider constant contained continuous convergence convex coordinates Corollary corresponding covering defined definition deformations denote depends determining differential dimension domain element equation equivalent exists extended fact fiber finite formula germs given gives Hence holds holomorphic functions holomorphic mapping ideal implies induced integral irreducible isomorphism Lemma linear locally Math means morphism natural neighborhood normal obtain positive problem projective Proof proper Proposition prove relation Remark respectively restriction result satisfies sheaf singular Stein manifold structure subgroup Suppose surface Take Theorem theory topological transmission unique values varieties vector