Complex Analysis: Proceedings of the Special Year Held at the University of Maryland, College Park, 1985-86, Volume 2Carlos A. Berenstein |
Contents
Don Aharonov | 1 |
J Arazy S Fisher and J Peetre | 10 |
E Amar | 12 |
Copyright | |
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analytic functions assume asymptotic automorphism group ball Berenstein Bergman kernel Bergman metric biholomorphic map boundary point bounded domain Carleson Carleson measures coefficients compact set compact subset Complex Analysis complex space components condition constant converges convex convex set convolution equations curvature defining function definition denote differential dimensional equivalent estimates exists extends Fefferman's finite follows Hence holomorphic functions homogeneous hypersurface implies inequality invariant of weight isomorphic Kähler Lemma Lie group linear manifold Math measure Meise Monge-Ampère N-tuple neighborhood normal families normal form operator orbit plurisubharmonic functions polynomial problem proof Proposition prove pseudoconvex domain real analytic result satisfies sequence slowly decreasing solution Stein space strongly pseudoconvex domain subgroup subharmonic subspace surjective Taylor Theorem theory topology vector Vogt weakly pseudoconvex weight function