Mini-workshop : rank one groups and exceptional algebraic groups
Tom De Medts
(UGent)
, Bernhard Mühlherr and Anastasia Stavrova
- Editor
- Tom De Medts (UGent) , Bernhard Mühlherr and Anastasia Stavrova
- Organization
- Abstract
- Rank one groups are a class of doubly transitive groups that are natural generalizations of the groups SL2(k). The most interesting examples arise from exceptional algebraic groups of relative rank one. This class of groups is, in turn, intimately related to structurable algebras. The goal of the mini-workshop was to bring together experts on these topics in order to make progress towards a better understanding of the structure of rank one groups.
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Citation
Please use this url to cite or link to this publication: http://hdl.handle.net/1854/LU-8686300
- MLA
- De Medts, Tom, et al., editors. “Mini-Workshop : Rank One Groups and Exceptional Algebraic Groups.” OBERWOLFACH REPORTS, vol. 16, no. 4, 2019, doi:10.4171/OWR/2019/52.
- APA
- De Medts, T., Mühlherr, B., & Stavrova, A. (Eds.). (2019). Mini-workshop : rank one groups and exceptional algebraic groups. https://doi.org/10.4171/OWR/2019/52
- Chicago author-date
- De Medts, Tom, Bernhard Mühlherr, and Anastasia Stavrova, eds. 2019. “Mini-Workshop : Rank One Groups and Exceptional Algebraic Groups.” OBERWOLFACH REPORTS. https://doi.org/10.4171/OWR/2019/52.
- Chicago author-date (all authors)
- De Medts, Tom, Bernhard Mühlherr, and Anastasia Stavrova, eds. 2019. “Mini-Workshop : Rank One Groups and Exceptional Algebraic Groups.” OBERWOLFACH REPORTS. doi:10.4171/OWR/2019/52.
- Vancouver
- 1.De Medts T, Mühlherr B, Stavrova A, editors. Mini-workshop : rank one groups and exceptional algebraic groups. Vol. 16, OBERWOLFACH REPORTS. 2019.
- IEEE
- [1]T. De Medts, B. Mühlherr, and A. Stavrova, Eds., “Mini-workshop : rank one groups and exceptional algebraic groups,” OBERWOLFACH REPORTS, vol. 16, no. 4. 2019.
@misc{8686300,
abstract = {{Rank one groups are a class of doubly transitive groups that are natural generalizations of the groups SL2(k). The most interesting examples arise from exceptional algebraic groups of relative rank one. This class of groups is, in turn, intimately related to structurable algebras. The goal of the mini-workshop was to bring together experts on these topics in order to make progress towards a better understanding of the structure of rank one groups.}},
editor = {{De Medts, Tom and Mühlherr, Bernhard and Stavrova, Anastasia}},
issn = {{1660-8933}},
language = {{eng}},
number = {{4}},
pages = {{28}},
series = {{OBERWOLFACH REPORTS}},
title = {{Mini-workshop : rank one groups and exceptional algebraic groups}},
url = {{http://doi.org/10.4171/OWR/2019/52}},
volume = {{16}},
year = {{2019}},
}
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