ENTROPHASE

Entropy formulation of evolutionary phase transitions

Coordinatore	FORSCHUNGSVERBUND BERLIN E.V.    more Spiacenti, non ci sono informazioni su questo coordinatore. Contattare Fabio per maggiori infomrazioni, grazie.
Nazionalità Coordinatore	Germany [DE]
Totale costo	659˙784 €
EC contributo	659˙784 €
Programma	FP7-IDEAS-ERC Specific programme: "Ideas" implementing the Seventh Framework Programme of the European Community for research, technological development and demonstration activities (2007 to 2013)
Code Call	ERC-2010-StG_20091028
Funding Scheme	ERC-SG
Anno di inizio	2011
Periodo (anno-mese-giorno)	2011-04-01   -   2016-06-30

 Partecipanti

#	participant	country	role	EC contrib. [€]
1	UNIVERSITA DEGLI STUDI DI MILANO  Organization address address: Via Festa Del Perdono 7 city: MILANO postcode: 20122 contact info Titolo: Dr. Nome: Luisa Cognome: Mondina Email: send email Telefono: 390250000000 Fax: 390250000000	IT (MILANO)	beneficiary	255˙397.56
2	FORSCHUNGSVERBUND BERLIN E.V.  Organization address address: Rudower Chaussee 17 city: BERLIN postcode: 12489 contact info Titolo: Dr. Nome: Friederike Cognome: Schmidt-Tremmel Email: send email Telefono: +49 30 63923481 Fax: +49 30 63923333	DE (BERLIN)	hostInstitution	404˙387.30
3	FORSCHUNGSVERBUND BERLIN E.V.  Organization address address: Rudower Chaussee 17 city: BERLIN postcode: 12489 contact info Titolo: Prof. Nome: Elisabetta Cognome: Rocca Email: send email Telefono: 493020000000 Fax: 493020000000	DE (BERLIN)	hostInstitution	404˙387.30

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 Obiettivo del progetto (Objective)

'The ground-breaking nature of the project relies on the possibility of opening new horizons with a novel mathematical formulation of physical problems. The project aim is indeed to obtain relevant mathematical results in order to get further insight into new models for phase transitions and the corresponding evolution PDE systems. The new approach presented here turns out to be particularly helpful within the investigation of issues like as existence, uniqueness, control, and long-time behavior of the solutions for such evolutionary PDEs.

Moreover, the importance of the opportunity to apply such new theory to phase transitions lies in the fact that such phenomena arise in a variety of applied problems like, e.g., melting and freezing in solid-liquid mixtures, phase changes in solids, crystal growth, soil freezing, damage in elastic materials, plasticity, food conservation, collisions, and so on. From the practical viewpoint, the possibility to describe these phenomena in a quantitative way has deeply influenced the technological development of our society, stimulating the related mathematical interest.'