SMS scnews item created by Timothy Bywaters at Tue 23 Oct 2018 1036
Type: Seminar
Distribution: World
Expiry: 6 Nov 2018
Calendar1: 6 Nov 2018 1100-1200
CalLoc1: Carslaw 375
CalTitle1: Schillewaert, On Exceptional Lie Geometries
Calendar2: 6 Nov 2018 1400-1500
CalLoc2: Carslaw 375
CalTitle2: Muehlherr, Root graded groups
Auth: timothyb@dora.maths.usyd.edu.au
Group Actions Seminar: Schillewaert, Muehlherr
The next Group Actions Seminar will be on Tuesday 6 November at the University of
Sydney. The schedule, titles and abstracts are below.
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11am - Noon, Carslaw 375
Speaker: Jeroen Schillewaert, The University of Auckland
Title: On Exceptional Lie Geometries
Abstract: Parapolar spaces are point-line geometries introduced as a geometric approach
to (exceptional) algebraic groups. We provide a characterization of a wide class of Lie
geometries as parapolar spaces satisfying a simple intersection property. In particular
many of the exceptional Lie geometries occur. In fact, our approach unifies and extends
several earlier characterizations of (exceptional) Lie geometries arising from spherical
Tits-buildings.
This is joint work with Anneleen De Schepper, Hendrik Van Maldeghem and Magali Victoor.
Noon - 2pm Lunch
2-3pm, Carslaw 375
Speaker: Bernhard Muehlherr, The University of Giessen
Title: Root graded groups
Abstract: A root graded group is a group containing a family of subgroups that is
indexed by a root system and satisfies certain commutation relations. The standard
examples are Chevalley groups over rings. The definition of a root grading of
a group is inspired by the corresponding notion for Lie algebras for which
there are classification results due to Berman, Moody, Benkart and Zelmanov from the
1990s. Much less is known in the group case.
In my talk I will address the classification problem for root graded groups
and its connection to the theory of buildings. It turns out that the Tits indices
known from the classification of the semi-simple algebraic groups provide an interesting
class of root gradings which are called stable. Any group with a stable root grading of
rank 2 acts naturally on a bipartite graph which is called a Tits polygon. This action
can be used to obtain classification results for groups with a stable root grading. I
will report on several results in this direction. These have been obtained recently in
joint work with Richard Weiss.