Lectures in Modern Analysis and Applications, Part 1This lecture series was presented by a consortium of universities in conjunction with the U.S. Air Force Office of Scientific Research during the period 1967-1969 in Washington, D.C. and at the University of Maryland. The series of lectures was devoted to active basic areas of contemporary analysis which is important in or shows potential in real-world applications. Each lecture presents a survey and critical review of aspects of the specific area addressed, with emphasis on new results, open problems, and applications. This volume contains nine lectures in the series; subsequent lectures will also be published. |
From inside the book
Try this search over all volumes: à ²à ´
Results 1-0 of 0
Contents
Professor KENNETH M HOFFMAN Massachusetts Institute of Technology | 1 |
induced by the algebra of bounded analytic functions especially | 7 |
Professor JOHN WERMER Institute for Advanced Study and Brown University | 30 |
Copyright | |
Other editions - View all
Common terms and phrases
a-holomorphic Analysis analytic functions arbitrary automorphisms Banach algebra Banach spaces boundary bounded analytic functions Cauchy problem closed coefficients cohomology compact support complex manifold complex structure complex variables condition constant continuous function defined denote Diff(M diffeomorphism differential operator dim Ker dimensional compact subvarieties distribution domain of holomorphy dynamical system element example exists fact Fourier transform Fredholm families Fredholm operator function algebras genus g Hilbert space holomorphic convexity holomorphic functions homeomorphism homotopy Hörmander HP M,S hyperbolic index F isomorphism Ker F Ker F(x lecture lemma level sets maximal ideal maximum modulus principle modular group neighborhood norm obtain open set plane polynomially convex positive dimensional compact proof properties pseudoconvex result Riemann surfaces satisfies Axiom sheaf smooth solution stability strongly pseudoconvex manifold subgroup Teichmüller spaces theorem theory topological uniqueness valued vector bundle vector space zero