GRAPHCONVSTOCH

Graph Convergence and Stochastic Processes on Graphs

Coordinatore	MAGYAR TUDOMANYOS AKADEMIA RENYI ALFRED MATEMATIKAI KUTATOINTEZET    more  Organization address address: REALTANODA STREET 13-15 city: Budapest postcode: 1053 contact info Titolo: Ms. Nome: Tiziana Cognome: Del Viscio Email: send email Telefono: +36 14838308 Fax: +36 14838333
Nazionalità Coordinatore	Hungary [HU]
Totale costo	190˙113 €
EC contributo	190˙113 €
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-2013-IEF
Funding Scheme	MC-IEF
Anno di inizio	2015
Periodo (anno-mese-giorno)	2015-02-01   -   2017-01-31

 Partecipanti

#	participant	country	role	EC contrib. [€]
1	MAGYAR TUDOMANYOS AKADEMIA RENYI ALFRED MATEMATIKAI KUTATOINTEZET  Organization address address: REALTANODA STREET 13-15 city: Budapest postcode: 1053 contact info Titolo: Ms. Nome: Tiziana Cognome: Del Viscio Email: send email Telefono: +36 14838308 Fax: +36 14838333	HU (Budapest)	coordinator	190˙113.60

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 Obiettivo del progetto (Objective)

'The proposal covers the following interconnected topics:

1. Benjamini-Schramm limits of finite graphs and stochastic processes on graphs; 2. continuity and testability of graph parameters; 3. factors of Bernoulli i.i.d. labellings; 4. graph sequences from groups.

The central object for the proposed research is sequences of sparse graphs (either coming from some random graph model or from Cayley graphs) and their Benjamini-Schramm limits.

Convergence of optimal values of graph parameters (and the stochastic processes that lie behind them) are to be studied. A typical question is how the limit is related to the optimal value arising as a factor of i.i.d.. The context of such questions is not only general convergent graph sequences and sequences of random regular graphs but also other models (e.g. scale-free graph families). Finally, questions on the asymptotic properties of balls in Cayley graphs are to be addressed.'