Record Nr.

UNISA996466594303316

Autore

Wengenroth Jochen

Titolo

Derived Functors in Functional Analysis [[electronic resource] /] / by Jochen Wengenroth

Pubbl/distr/stampa


Berlin, Heidelberg : , : Springer Berlin Heidelberg : , : Imprint : Springer, , 2003

ISBN

3-540-36211-8

Edizione

[1st ed. 2003.]

Descrizione fisica

1 online resource (X, 138 p.)

Collana

Lecture Notes in Mathematics, , 0075-8434 ; ; 1810

Disciplina

515.7

Soggetti

Functional analysis

Category theory (Mathematics)

Homological algebra

Partial differential equations

Functional Analysis

Category Theory, Homological Algebra

Partial Differential Equations

Lingua di pubblicazione

Inglese

Formato

Materiale a stampa

Livello bibliografico

Monografia

Note generali

Bibliographic Level Mode of Issuance: Monograph

Nota di bibliografia

Includes bibliographical references (pages [129]-132) and index.

Nota di contenuto

Introduction -- Notions from homological algebra: Derived Functors; The category of locally convex spaces -- The projective limit functor for countable spectra: Projective limits of linear spaces; The Mittag-Leffler procedure; Projective limits of locally convex spaces; Some Applications: The Mittag-Leffler theorem; Separating singularities; Surjectivity of the Cauchy-Riemann operator; Surjectivity of P(D) on spaces of smooth functions; Surjectivity of P(D) the space of distributions; Differential operators for ultradifferentiable functions of Roumieu type -- Uncountable projective spectra: Projective spectra of linear spaces; Insertion: The completion functor; Projective spectra of locally convex spaces -- The derived functors of Hom: Extk in the category of locally convex spaces; Splitting theory for Fréchet spaces; Splitting in the category of (PLS)-spaces -- Inductive spectra of locally convex spaces -- The duality functor -- References -- Index.

Sommario/riassunto

The text contains for the first time in book form the state of the art of homological methods in functional analysis like characterizations of the

vanishing of the derived projective limit functor or the functors Ext1 (E, F) for Fréchet and more general spaces. The researcher in real and complex analysis finds powerful tools to solve surjectivity problems e.g. on spaces of distributions or to characterize the existence of solution operators. The requirements from homological algebra are minimized: all one needs is summarized on a few pages. The answers to several questions of V.P. Palamodov who invented homological methods in analysis also show the limits of the program.