SAMTFP

"Stochastic Analysis, Mass Transportation and Free Probability"

 Coordinatore INSTITUTUL DE MATEMATICA AL ACADEMI EI ROMANE INSTITUTE OF MATHEMATICS SIMION STOILOW OF THE ROMANIAN ACA DEMY 

 Organization address address: Calea Grivitei 21
city: BUCUREST
postcode: 10702

contact info
Titolo: Ms.
Nome: Gabriela
Cognome: Pahonea
Email: send email
Telefono: 40213196506
Fax: 40213196505

 Nazionalità Coordinatore Romania [RO]
 Totale costo 100˙000 €
 EC contributo 100˙000 €
 Programma FP7-PEOPLE
Specific programme "People" implementing the Seventh Framework Programme of the European Community for research, technological development and demonstration activities (2007 to 2013)
 Code Call FP7-PEOPLE-2009-RG
 Funding Scheme MC-IRG
 Anno di inizio 2010
 Periodo (anno-mese-giorno) 2010-01-01   -   2013-12-31

 Partecipanti

# participant  country  role  EC contrib. [€] 
1    INSTITUTUL DE MATEMATICA AL ACADEMI EI ROMANE INSTITUTE OF MATHEMATICS SIMION STOILOW OF THE ROMANIAN ACA DEMY

 Organization address address: Calea Grivitei 21
city: BUCUREST
postcode: 10702

contact info
Titolo: Ms.
Nome: Gabriela
Cognome: Pahonea
Email: send email
Telefono: 40213196506
Fax: 40213196505

RO (BUCUREST) coordinator 100˙000.00

Mappa


 Word cloud

Esplora la "nuvola delle parole (Word Cloud) per avere un'idea di massima del progetto.

inequality    probability    first    transportation    matrices    free    random    morse   

 Obiettivo del progetto (Objective)

'There are three different topics related to this project. The first one is an interplay between probability and Morse theory. The main idea is to exploit in the probabilitisc framework a suggestion of Witten and recover the Morse-Smale complex of a Morse function using asymptotics of Wiener functionals. The second topic is the study of transportation cost inequality on the path space of a Riemannian manifold and its connections with Log-Sobolev and HWI inequality of Otto-Villani. There were some attempts in the literature but it seems that the appropriate distance is yet to be settled. The third topic is in free probability. This regards first, second and higher order asymptotic freeness of Wigner ensembles and constant matrices. The results are to be applied to the study of random matrices with dependencies. Regarding functional inequalities in free probability, the standard tool is the random matrix approximation. The investigator used mass transportation thechiques to provide proofs of some of these inequalites in one dimensional free probability for measures on the line. Part of this proposal is an extension of these results to measures on the circle or in plane as well several noncommutative random variables.'

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NUTRAILS (2012)

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