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Hyperfunctions on Hypo-Analytic Manifolds (AM-136), Volume 136 / / Paulo Cordaro, François Treves



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Autore: Cordaro Paulo Visualizza persona
Titolo: Hyperfunctions on Hypo-Analytic Manifolds (AM-136), Volume 136 / / Paulo Cordaro, François Treves Visualizza cluster
Pubblicazione: Princeton, NJ : , : Princeton University Press, , [2016]
©1995
Descrizione fisica: 1 online resource (398 pages)
Disciplina: 515/.782
Soggetto topico: Hyperfunctions
Submanifolds
Soggetto non controllato: Alexander Grothendieck
Analytic function
Analytic manifold
Borel transform
Boundary value problem
Bounded function
Bounded set (topological vector space)
Bounded set
C0
CR manifold
Cauchy problem
Codimension
Coefficient
Cohomology
Compact space
Complex manifold
Complex number
Complex space
Connected space
Continuous function (set theory)
Continuous function
Convex set
Convolution
Cotangent bundle
Counterexample
De Rham cohomology
Dense set
Differential operator
Disjoint union
Domain of a function
Eigenvalues and eigenvectors
Embedding
Entire function
Equation
Equivalence class
Equivalence relation
Euclidean space
Existential quantification
Exterior algebra
Exterior derivative
Fiber bundle
Fourier transform
Function space
Functional analysis
Fundamental solution
Harmonic function
Holomorphic function
Homomorphism
Hyperfunction
Hypersurface
Infimum and supremum
Integration by parts
Laplace's equation
Limit of a sequence
Linear map
Linear space (geometry)
Linear subspace
Locally convex topological vector space
Mathematical induction
Montel space
Montel's theorem
Morphism
Neighbourhood (mathematics)
Norm (mathematics)
Open set
Partial derivative
Partial differential equation
Polytope
Presheaf (category theory)
Pullback (category theory)
Pullback
Quotient space (topology)
Radon measure
Real structure
Riemann sphere
Serre duality
Several complex variables
Sheaf (mathematics)
Sheaf cohomology
Singular integral
Sobolev space
Special case
Submanifold
Subsequence
Subset
Summation
Tangent bundle
Theorem
Topology of uniform convergence
Topology
Transitive relation
Transpose
Transversal (geometry)
Uniform convergence
Uniqueness theorem
Vanish at infinity
Variable (mathematics)
Vector bundle
Vector field
Wave front set
Persona (resp. second.): TrevesFrançois
Note generali: Bibliographic Level Mode of Issuance: Monograph
Nota di bibliografia: Includes bibliographical references and index.
Nota di contenuto: Frontmatter -- CONTENTS -- PREFACE -- 0.1 BACKGROUND ON SHEAVES OF VECTOR SPACES OVER A MANIFOLD -- 0.2 BACKGROUND ON SHEAF COHOMOLOGY -- CHAPTER I. HYPERFUNCTION S IN A MAXIMAL HYPO-ANALYTIC STRUCTURE -- CHAPTER II. MICROLOCAL THEORY OF HYPERFUNCTIONS ON A MAXIMALLY REAL SUBMANIFOLD OF COMPLEX SPACE -- CHAPTER III. HYPERFUNCTION SOLUTIONS IN A HYPO-ANALYTIC MANIFOLD -- CHAPTER IV. TRANSVERSAL SMOOTHNESS OF HYPERFUNCTION SOLUTIONS -- HISTORICAL NOTES -- BIBLIOGRAPHICAL REFERENCES -- INDEX OF TERMS
Sommario/riassunto: In the first two chapters of this book, the reader will find a complete and systematic exposition of the theory of hyperfunctions on totally real submanifolds of multidimensional complex space, in particular of hyperfunction theory in real space. The book provides precise definitions of the hypo-analytic wave-front set and of the Fourier-Bros-Iagolnitzer transform of a hyperfunction. These are used to prove a very general version of the famed Theorem of the Edge of the Wedge. The last two chapters define the hyperfunction solutions on a general (smooth) hypo-analytic manifold, of which particular examples are the real analytic manifolds and the embedded CR manifolds. The main results here are the invariance of the spaces of hyperfunction solutions and the transversal smoothness of every hyperfunction solution. From this follows the uniqueness of solutions in the Cauchy problem with initial data on a maximally real submanifold, and the fact that the support of any solution is the union of orbits of the structure.
Titolo autorizzato: Hyperfunctions on Hypo-Analytic Manifolds (AM-136), Volume 136  Visualizza cluster
ISBN: 1-4008-8256-7
Formato: Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione: Inglese
Record Nr.: 9910154744403321
Lo trovi qui: Univ. Federico II
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Serie: Annals of mathematics studies ; ; no. 136.