1.

Record Nr.

UNISA990002762820203316

Autore

TOMMASI, Roberto

Titolo

Tutela possessoria del privato nei confronti della P.A. : dopo la riforma del codice di procedura civile : con formulario e CD-ROM : aggiornato con: D.L. n.35/2005 (conv. in L.80/2005) (riforma del cod. proc. civ.), legge n. 15/2005 (modifiche ed integrazioni alla L. n. 241/1990), legge n. 51/2006 (entrata in vigore modifiche del cod. proc. civ.) / Roberto Tommasi

Pubbl/distr/stampa

Santarcangelo di Romagna : Maggioli, 2006

ISBN

88-387-3374-0

Descrizione fisica

484 p. ; 24 cm. + 1 CD-ROM

Collana

Legale civile ; 102

Disciplina

342.45066

Soggetti

Procedimento amministrativo

Collocazione

XXX.A. Coll. 99/ 38 (COLL STY 102)

Lingua di pubblicazione

Italiano

Formato

Materiale a stampa

Livello bibliografico

Monografia


2.

Record Nr.

UNINA9910574057403321

Titolo

Analytic Continuation and q-Convexity / / by Takeo Ohsawa, Thomas Pawlaschyk

Pubbl/distr/stampa

Singapore : , : Springer Nature Singapore : , : Imprint : Springer, , 2022

ISBN

981-19-1239-4

Edizione

[1st ed. 2022.]

Descrizione fisica

1 online resource (66 pages)

Collana

SpringerBriefs in Mathematics, , 2191-8201

Disciplina

050

Soggetti

Functions of complex variables

Several Complex Variables and Analytic Spaces

Lingua di pubblicazione

Inglese

Formato

Materiale a stampa

Livello bibliografico

Monografia

Note generali

Description based upon print version of record.

Nota di bibliografia

Includes bibliographical references and index.

Nota di contenuto

1. Analytic Continuation and Pseudoconvexity -- 2. q-Plurisubharmonicity -- 3. q-Pseudoconvexity -- 4. q-Convexity and q-Completeness -- References -- Index.

Sommario/riassunto

The focus of this book is on the further development of the classical achievements in analysis of several complex variables, the analytic continuation and the analytic structure of sets, to settings in which the q-pseudoconvexity in the sense of Rothstein and the q-convexity in the sense of Grauert play a crucial role. After giving a brief survey of notions of generalized convexity and their most important results, the authors present recent statements on analytic continuation related to them. Rothstein (1955) first introduced q-pseudoconvexity using generalized Hartogs figures. Słodkowski (1986) defined q-pseudoconvex sets by means of the existence of exhaustion functions which are q-plurisubharmonic in the sense of Hunt and Murray (1978). Examples of q-pseudoconvex sets appear as complements of analytic sets. Here, the relation of the analytic structure of graphs of continuous surfaces whose complements are q-pseudoconvex is investigated. As an outcome, the authors generalize results by Hartogs (1909), Shcherbina (1993), and Chirka (2001) on the existence of foliations of pseudoconcave continuous real hypersurfaces by smooth complex ones. A similar generalization is obtained by a completely different approach using L²-methods in the setting of q-convex spaces. The notion of q-convexity was developed by Rothstein (1955) and Grauert



(1959) and extended to q-convex spaces by Andreotti and Grauert (1962). Andreotti–Grauert's finiteness theorem was applied by Andreotti and Norguet (1966–1971) to extend Grauert's solution of the Levi problem to q-convex spaces. A consequence is that the sets of (q-1)-cycles of q-convex domains with smooth boundaries in projective algebraic manifolds, which are equipped with complex structures as open subsets of Chow varieties, are in fact holomorphically convex. Complements of analytic curves are studied,and the relation of q-convexity and cycle spaces is explained. Finally, results for q-convex domains in projective spaces are shown and the q-convexity in analytic families is investigated.