Théorie des groupes
Generalized root systems
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Europe/Brussels
B/2nd floor-B.203 - Seminar room (Marc de Hemptinne (chemin du Cyclotron, 2, Louvain-la-Neuve))
B/2nd floor-B.203 - Seminar room
Marc de Hemptinne (chemin du Cyclotron, 2, Louvain-la-Neuve)
20
Description
Generalized root systems (GRS) unite different generalizations of root systems in one concept. We call a finite, non-empty subset Φ of a Euclidean vector space E a GRS if for every α,β∈Φ:
- α⋅β>0⇒α−β∈Φ
- α⋅β=0⇒[α−β∈Φ⇔α+β∈Φ]
These properties are preserved under factoring roots out of a GRS (which we call quotient taking). M. Cuntz and B. Mühlherr used the classification of crystallographic arrangements to prove that every GRS of rank ≥2 is equivalent to a quotient of a classical root system.
My talk will concern my current work on proving this same result in an elementary fashion without relying on advanced results.