EPSILON

Elliptic Pdes and Symmetry of Interfaces and Layers for Odd Nonlinearities

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	850˙000 €
EC contributo	850˙000 €
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-2011-StG_20101014
Funding Scheme	ERC-SG
Anno di inizio	2012
Periodo (anno-mese-giorno)	2012-01-01   -   2016-12-31

 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	157˙793.44
2	UNIVERSITA DEGLI STUDI DI ROMA TOR VERGATA  Organization address address: VIA ORAZIO RAIMONDO 18 city: ROMA postcode: 173 contact info Titolo: Prof. Nome: Renato Cognome: Lauro Email: send email Telefono: 390673000000 Fax: 39067236605	IT (ROMA)	beneficiary	0.00
3	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	692˙206.56
4	FORSCHUNGSVERBUND BERLIN E.V.  Organization address address: Rudower Chaussee 17 city: BERLIN postcode: 12489 contact info Titolo: Prof. Nome: Enrico Cognome: Valdinoci Email: send email Telefono: 393286000000 Fax: 493020000000	DE (BERLIN)	hostInstitution	692˙206.56

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 Obiettivo del progetto (Objective)

'The scope of this project is to perform an analytical study of the geometric properties of the interafaces arising in the scalar Ginzburg-Landau-Allen-Cahn equation, with particular attention to possible 1D symmetries.

Also, we would like to analyze the cases in which the operator is singular, degenrate, subelliptic or fractional and to obtain results for PDEs in manifold and in inverse overdetermined problems, since all these models share some important features with classical semilinear PDEs and possess a wide range of potential applications.

To achieve our goals, we would like to build a small, mobile and specialized team of young researchers with outstanding professional skills, specialized in the above subjects, which has a long history together, new upcoming projects and a network to spread out to.'