GELATI

Geometry of exceptional Lie algebras à la Tits

 Coordinatore IMPERIAL COLLEGE OF SCIENCE, TECHNOLOGY AND MEDICINE 

 Organization address address: SOUTH KENSINGTON CAMPUS EXHIBITION ROAD
city: LONDON
postcode: SW7 2AZ

contact info
Titolo: Ms.
Nome: Brooke
Cognome: Alasya
Email: send email
Telefono: +44 207 594 1181
Fax: +44 207 594 1418

 Nazionalità Coordinatore United Kingdom [UK]
 Totale costo 221˙606 €
 EC contributo 221˙606 €
 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-2012-IEF
 Funding Scheme MC-IEF
 Anno di inizio 2013
 Periodo (anno-mese-giorno) 2013-04-01   -   2015-03-31

 Partecipanti

# participant  country  role  EC contrib. [€] 
1    IMPERIAL COLLEGE OF SCIENCE, TECHNOLOGY AND MEDICINE

 Organization address address: SOUTH KENSINGTON CAMPUS EXHIBITION ROAD
city: LONDON
postcode: SW7 2AZ

contact info
Titolo: Ms.
Nome: Brooke
Cognome: Alasya
Email: send email
Telefono: +44 207 594 1181
Fax: +44 207 594 1418

UK (LONDON) coordinator 221˙606.40

Mappa


 Word cloud

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

prize    groups    geometries    embeddings    algebraic    tits    lie    geometry    varieties    arbitrary    exceptional   

 Obiettivo del progetto (Objective)

'The proposal concerns algebraic groups and their associated geometries, in particular those of exceptional type. The main goal of the proposal is to give a uniform axiomatic description of the embeddings in projective space of the varieties occurring in the Freudenthal-Tits magic square. For instance, the second row comprises Severi-Brauer varieties, which have applications in Galois cohomology. Of special interest are the geometries of exceptional Lie type over arbitrary fields, where we would obtain a purely geometric characterization of F4, E6, E7 and E8. In particular this involves a direct construction of the 248-dimensional E8-module.

In the spirit of the work of Tits (Abel prize 2008) and Aschbacher (Wolf Prize 2012), there is a nice interaction between geometry and groups. The embeddings (geometry) will provide fruitful information about the subgroup structure of finite simple groups and groups of Lie type over arbitrary fields, and conversely, the expert knowledge of Prof. Liebeck on algebraic groups will help describe the embeddings.'

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