## Complex analysis: proceedings of the special year held at the University of Maryland, College Park, 1985-86, Volume 2 |

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### Contents

H Alexander | 1 |

E Amar | 12 |

Richard Beals and Nancy K Stanton | 25 |

Copyright | |

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### Common terms and phrases

algebra analytic functions argument assume asymptotic Aut(fi Aut(M Aut(n automorphism group Berenstein Bergman kernel Bergman metric biholomorphic map boundary point bounded domain canonical mapping Carleson measures coefficients compact set compact subset Complex Analysis complex space components condition constant converges convex set convolution equations countable defining function definition denote differential dimension entire functions estimates exists extends Fefferman's fixed follows function f geometry given Hence holomorphic functions homeomorphism homogeneous hypersurface implies inequality integral interpolation invariant of weight isomorphic Lemma Lie group linear manifold Math Meise Monge-Ampere N-tuple neighborhood norm normal families normal form obtained open set operator orbit plurisubharmonic functions Proposition prove pseudoconvex domain real analytic result satisfies sequence Siciak 21 slowly decreasing solution Stein space strictly pseudoconvex domain strongly pseudoconvex domain subgroup subharmonic subspace Suppose surjective Taylor theory topology vector Vogt weight function