Asymptotics of Operator Semigroups

Obiettivo

The theory of asymptotic behaviour of operator semigroups is a comparatively new field serving as a common denominator for many other areas
of mathematics, such as for instance the theory of partial differential equations, complex analysis, harmonic analysis and topology.

The primary interest in the study of asymptotic properties of strongly continuous operator semi-groups comes from the fact that such semigroups
solve abstract Cauchy problems which are often models for various phenomena arising in natural sciences, engineering and economics.
Knowledge of the asymptotics of semigroups allows one to determine the character of long-time evolution of these phenomena.

Despite an obvious importance, the asymptotic theory of one-parameter strongly continuous operator semigroups was for a very long time a
collection of scattered facts rather than an organized area of research. The interest increased in the 1980s and the theory has witnessed a
dramatic development over the past thirty years.

Still there is a number of notorious open problems that have been left open. These missing blocks prevent the theory from being complete, slow
down the development of the theory and discourage specialists from related fields to engage into the theory.

The goal of the project is to give new impetus to the theory of asymptotic behavior of operator semigroups. To this aim we plan to extend and
unify various aspects of the asymptotic theory of operator semigroups: stability, hyperbolicity, rigidity, boundedness, relations to Fredholm
property, to work out new methods and to solve several long-standing open problems thus giving the theory its final shape.

We intend to create an international forum that enables and promotes a multi- and cross- disciplinary exchange of ideas, methods and tools under the common umbrella of asymptotic theory of operator semigroups. Thus we expect that, moreover, a wide range of modern analysis will benefit from the project.

Campo scientifico (EuroSciVoc)

CORDIS classifica i progetti con EuroSciVoc, una tassonomia multilingue dei campi scientifici, attraverso un processo semi-automatico basato su tecniche NLP. Cfr.: https://op.europa.eu/it/web/eu-vocabularies/euroscivoc.

• scienze naturali matematica matematica pura analisi matematica analisi complessa
• scienze naturali matematica matematica pura analisi matematica equazioni differenziali equazioni differenziali parziali

Programma(i)

Programmi di finanziamento pluriennali che definiscono le priorità dell’UE in materia di ricerca e innovazione.

• FP7-PEOPLE - Specific programme "People" implementing the Seventh Framework Programme of the European Community for research, technological development and demonstration activities (2007 to 2013)

Argomento(i)

Gli inviti a presentare proposte sono suddivisi per argomenti. Un argomento definisce un’area o un tema specifico per il quale i candidati possono presentare proposte. La descrizione di un argomento comprende il suo ambito specifico e l’impatto previsto del progetto finanziato.

• FP7-PEOPLE-2012-IRSES - Marie Curie Action "International Research Staff Exchange Scheme"

Invito a presentare proposte

Procedura per invitare i candidati a presentare proposte di progetti, con l’obiettivo di ricevere finanziamenti dall’UE.

FP7-PEOPLE-2012-IRSES
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Meccanismo di finanziamento

Meccanismo di finanziamento (o «Tipo di azione») all’interno di un programma con caratteristiche comuni. Specifica: l’ambito di ciò che viene finanziato; il tasso di rimborso; i criteri di valutazione specifici per qualificarsi per il finanziamento; l’uso di forme semplificate di costi come gli importi forfettari.

MC-IRSES - International research staff exchange scheme (IRSES)

Coordinatore

Partecipanti (9)