1. Finite fields

2. Non-archimedean local fields

3. Archimedean local fields

4. See also

5. References

In mathematics, a unipotent representation of a reductive group is a representation that has some similarities with unipotent conjugacy classes of groups.

Informally, Langlands philosophy suggests that there should be a correspondence between representations of a reductive group and conjugacy classes a Langlands dual group, and the unipotent representations should be roughly the ones corresponding to unipotent classes in the dual group.

Unipotent representations are supposed to be the basic "building blocks" out of which one can construct all other representations in the following sense.

Unipotent representations should form a small (preferably finite) set of irreducible representations for each reductive group, such that all irreducible representations can be obtained from unipotent representations of possibly smaller groups by some sort of systematic process, such as (cohomological or parabolic) induction.

Finite fields

Over finite fields, the unipotent representations are those that occur in the decomposition of the Deligne–Lusztig characters R{{su|p=1|b=T}} of the trivial representation 1 of a torus T . They were classified by {{harvs|txt|last=Lusztig|year1=1978|year2=1979}}.

Some examples of unipotent representations over finite fields are the trivial 1-dimensional representation, the Steinberg representation, and θ₁₀.

Non-archimedean local fields

Archimedean local fields

See also

• Deligne–Lusztig theory

References

• {{Citation | last1=Barbasch | first1=Dan | editor1-last=Satake | editor1-first=Ichirô | title=Proceedings of the International Congress of Mathematicians, Vol. II (Kyoto, 1990) | url=http://mathunion.org/ICM/ICM1990.2/ | publisher=Math. Soc. Japan | location=Tokyo | isbn=978-4-431-70047-0 | mr=1159263 | year=1991 | chapter=Unipotent representations for real reductive groups | pages=769–777}}
• {{Citation | last1=Lusztig | first1=George | title=Unipotent representations of a finite Chevalley group of type E₈ | doi=10.1093/qmath/30.3.315 | mr=545068 | year=1979 | journal=The Quarterly Journal of Mathematics. Oxford. Second Series | issn=0033-5606 | volume=30 | issue=3 | pages=315–338}}
• {{Citation | last1=Lusztig | first1=George | title=Representations of finite Chevalley groups | url=https://books.google.com/books?id=wn27F59-SwAC | publisher=American Mathematical Society | location=Providence, R.I. | series=CBMS Regional Conference Series in Mathematics | isbn=978-0-8218-1689-9 | mr=518617 | year=1978 | volume=39}}
• {{Citation | last1=Lusztig | first1=George | title=Classification of unipotent representations of simple p-adic groups | doi=10.1155/S1073792895000353 | mr=1369407 | year=1995 | journal=International Mathematics Research Notices | issn=1073-7928 | issue=11 | pages=517–589| arxiv=math/0111248 }}
• {{Citation | last1=Vogan | first1=David A. | title=Unitary representations of reductive Lie groups | url=https://books.google.com/books?id=0O-9c_kImJYC | publisher=Princeton University Press | series=Annals of Mathematics Studies | isbn=978-0-691-08482-4 | year=1987 | volume=118}}

• Hendrik Dillens
• Hendrik (disambiguation)
• Hendrik Faydherbe
• Hendrik Feldwehr
• Hendrik Fernandez
• Hendrik Frans de Cort
• Hendrik-Frans De Cort
• Hendrik Frans De Cort
• Hendrik Frans van Lint
• Hendrik Frans Verbruggen
• Hendrik Frans Verbrugghen
• Hendrik (given name)
• Hendrik G. Meijer
• Hendrik Goosen
• Hendrik Grijff
• Hendrik Grossoehmichen
• Hendrik Grossohmichen
• Hendrik Großöhmichen
• Hendrik Heerschop
• Hendrik Helmke
• Hendrik Hoppenstedt
• Hendrik II van Brabant
• Hendrik Jacob Hamaker
• Hendrik Jacob Scholten
• Hendrik Jacobszoon Lucifer