HFAKT

Homogeneous Flows and their Application in Kinetic Theory

Coordinatore	UNIVERSITY OF BRISTOL    more Spiacenti, non ci sono informazioni su questo coordinatore. Contattare Fabio per maggiori infomrazioni, grazie.
Nazionalità Coordinatore	United Kingdom [UK]
Totale costo	1˙339˙620 €
EC contributo	1˙339˙620 €
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-ADG_20110209
Funding Scheme	ERC-AG
Anno di inizio	2012
Periodo (anno-mese-giorno)	2012-04-01   -   2017-03-31

 Partecipanti

#	participant	country	role	EC contrib. [€]
1	UNIVERSITY OF BRISTOL  Organization address address: TYNDALL AVENUE SENATE HOUSE city: BRISTOL postcode: BS8 1TH contact info Titolo: Ms. Nome: Audrey Cognome: Michael Email: send email Telefono: +44 117 3317371 Fax: +44 117 9250900	UK (BRISTOL)	hostInstitution	1˙339˙620.00
2	UNIVERSITY OF BRISTOL  Organization address address: TYNDALL AVENUE SENATE HOUSE city: BRISTOL postcode: BS8 1TH contact info Titolo: Prof. Nome: Jens Cognome: Marklof Email: send email Telefono: +44 117 9287980	UK (BRISTOL)	hostInstitution	1˙339˙620.00

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 Obiettivo del progetto (Objective)

'Since the pioneering work of Maxwell and Boltzmann in the 1860s and 1870s, a major challenge in mathematical physics has been the derivation of macroscopic evolution equations from the fundamental microscopic laws of classical or quantum mechanics. The key idea of the present proposal is to introduce a renormalization technique that will provide a new route to attack some of the most important questions in the kinetic theory of gases. This technique uses the ergodic theory of flows on homogeneous spaces (homogeneous flows for short), and builds on my recent breakthrough in the case of the Lorentz gas (in joint with Andreas Strömbergsson, Uppsala). The key feature of the proposed approach is measure rigidity, a deep and powerful technical tool that has so far mainly seen success in solving long-standing problems in number theory and quantum chaos. The arguments developed in this proposal are not only interesting from a rigorous mathematical viewpoint, but also yield a heuristic mechanism for finding previously unknown kinetic transport equations that incorporate the effects of long-range order in microscopic particle distributions. This project joins together two distinct research fields, kinetic theory and the ergodic theory of flows on homogeneous spaces. If successful, the proposed research will constitute a significant breakthrough in the subject.'