Difference between revisions of "Kneser-Tits hypothesis"
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| − | The Kneser–Tits conjecture | + | The ''Kneser–Tits conjecture'' |
| − | + | is a conjecture on the structure of the $k$-simple simply-connected algebraic groups that are isotropic over a field $k$. Namely, the Kneser–Tits conjecture states that the group $G_k$ of $k$-rational points of a $k$-simple simply-connected isotropic | |
| − | + | [[Algebraic group|algebraic group]] $G$ over a field $k$ is generated by its unipotent elements. This conjecture was stated in a somewhat less general form by M. Kneser; the general statement is due to J. Tits | |
| − | + | {{Cite|Ti}}. For a group of type $A_n$ (see | |
| − | + | [[Semi-simple algebraic group|Semi-simple algebraic group]]) the Kneser–Tits conjecture is equivalent to the Tannaka–Artin problem: Does the group $\def\SL{\textrm{SL}}\SL(1,D)$ of elements of reduced norm one of a finite-dimensional skew-field $D$ coincide with the commutator subgroup $[D^*,D^*]$ of its multiplicative group $D^*$? The Kneser–Tits conjecture has a close connection with questions of approximation in algebraic groups, rationality of group varieties and algebraic $K$-theory. | |
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| + | The Kneser–Tits conjecture has been proved for the case of locally compact fields | ||
| + | {{Cite|Pl}} and also for global function fields | ||
| + | {{Cite|Pl2}}. Moreover, for global fields of characteristic zero the method of descent in | ||
| + | {{Cite|Pl}} led to a proof of the Kneser–Tits conjecture for all algebraic groups except for those of types $E_6$ and $E_8$. However, the Kneser–Tits conjecture is not true in general, as follows from the negative solution to the Tannaka–Artin problem | ||
| + | {{Cite|Pl3}}. As a result of this, progress has been made on the problem of the investigation of the measure of deviation of $\SL(1,D)$ from $[D^*,D^*]$, which is expressible by the reduced | ||
| + | [[Whitehead group|Whitehead group]] (cf. also | ||
| + | [[Linear group|Linear group]]). The results obtained along these lines ({{Cite|Pl4}}–{{Cite|Pl5}}) form the basis of reduced $K$-theory. It has been proved in | ||
| + | {{Cite|PlYa}} that the Kneser–Tits conjecture is also false for unitary groups, which in turn opens up a path for the development of reduced unitary $K$-theory. | ||
====References==== | ====References==== | ||
| − | + | {| | |
| + | |- | ||
| + | |valign="top"|{{Ref|Pl}}||valign="top"| V.P. Platonov, "The problem of strong approximation and the Kneser–Tits conjecture for algebraic groups" ''Math. USSR Izv.'', '''3''' : 6 (1969) pp. 1135–1148 ''Izv. Akad. Nauk SSSR. Ser. Mat.'', '''33''' : 6 (1969) pp. 1121–1220 {{ZBL|0217.36301}} | ||
| + | |- | ||
| + | |valign="top"|{{Ref|Pl3}}||valign="top"| V.P. Platonov, "On the Tannaka–Artin problem" ''Soviet Math. Dokl.'', '''16''' (1975) pp. 468–473 ''Dokl. Akad. Nauk SSSR'', '''221''' : 5 (1975) pp. 1038–1041 {{MR|0384857}} {{MR|0384858}} {{ZBL|0333.20032}} | ||
| + | |- | ||
| + | |valign="top"|{{Ref|Pl4}}||valign="top"| V.P. Platonov, "The Tannaka–Artin problem and reduced $K$-theory" ''Math. USSR Izv.'', '''40''' : 2 (1976) pp. 211–244 ''Izv. Akad, Nauk SSSR. Ser. Mat.'', '''40''' : 2 (1976) pp. 227–261 | ||
| + | |- | ||
| + | |valign="top"|{{Ref|Pl5}}||valign="top"| V.P. Platonov, "The infinitude of the reduced Whitehead group in the Tannaka–Artin problem" ''Math. USSR Sb.'', '''29''' (1976) pp. 167–176 ''Mat. Sb.'', '''100''' : 2 (1976) pp. 191–200 | ||
| + | |- | ||
| + | |valign="top"|{{Ref|PlYa}}||valign="top"| V.P. Platonov, V.I. Yanchevskii, "On the Kneser–Tits conjecture for unitary groups" ''Soviet Math. Dokl.'', '''16''' (1975) pp. 1456–1460 ''Dokl. Akad. Nauk SSSR'', '''225''' : 1 (1975) pp. 48–51 {{ZBL|0343.16016}} | ||
| + | |- | ||
| + | |valign="top"|{{Ref|PrRa}}||valign="top"| G. Prasad, M.S. Raghunathan, "On the Kneser–Tits problem" ''Math. Helv.'', '''60''' (1985) pp. 107–121 {{MR|0787664}} {{ZBL|0574.20033}} | ||
| + | |- | ||
| + | |valign="top"|{{Ref|Ti}}||valign="top"| J. Tits, "Algebraic and abstract simple groups" ''Ann. of Math.'', '''80''' : 2 (1964) pp. 313–329 {{MR|0164968}} {{ZBL|0131.26501}} | ||
| + | |- | ||
| + | |} | ||
Revision as of 18:55, 1 March 2012
2020 Mathematics Subject Classification: Primary: 20G15 Secondary: 20G25 [MSN][ZBL]
The Kneser–Tits conjecture
is a conjecture on the structure of the $k$-simple simply-connected algebraic groups that are isotropic over a field $k$. Namely, the Kneser–Tits conjecture states that the group $G_k$ of $k$-rational points of a $k$-simple simply-connected isotropic
algebraic group $G$ over a field $k$ is generated by its unipotent elements. This conjecture was stated in a somewhat less general form by M. Kneser; the general statement is due to J. Tits
[Ti]. For a group of type $A_n$ (see
Semi-simple algebraic group) the Kneser–Tits conjecture is equivalent to the Tannaka–Artin problem: Does the group $\def\SL{\textrm{SL}}\SL(1,D)$ of elements of reduced norm one of a finite-dimensional skew-field $D$ coincide with the commutator subgroup $[D^*,D^*]$ of its multiplicative group $D^*$? The Kneser–Tits conjecture has a close connection with questions of approximation in algebraic groups, rationality of group varieties and algebraic $K$-theory.
The Kneser–Tits conjecture has been proved for the case of locally compact fields [Pl] and also for global function fields [Pl2]. Moreover, for global fields of characteristic zero the method of descent in [Pl] led to a proof of the Kneser–Tits conjecture for all algebraic groups except for those of types $E_6$ and $E_8$. However, the Kneser–Tits conjecture is not true in general, as follows from the negative solution to the Tannaka–Artin problem [Pl3]. As a result of this, progress has been made on the problem of the investigation of the measure of deviation of $\SL(1,D)$ from $[D^*,D^*]$, which is expressible by the reduced Whitehead group (cf. also Linear group). The results obtained along these lines ([Pl4]–[Pl5]) form the basis of reduced $K$-theory. It has been proved in [PlYa] that the Kneser–Tits conjecture is also false for unitary groups, which in turn opens up a path for the development of reduced unitary $K$-theory.
References
| [Pl] | V.P. Platonov, "The problem of strong approximation and the Kneser–Tits conjecture for algebraic groups" Math. USSR Izv., 3 : 6 (1969) pp. 1135–1148 Izv. Akad. Nauk SSSR. Ser. Mat., 33 : 6 (1969) pp. 1121–1220 Zbl 0217.36301 |
| [Pl3] | V.P. Platonov, "On the Tannaka–Artin problem" Soviet Math. Dokl., 16 (1975) pp. 468–473 Dokl. Akad. Nauk SSSR, 221 : 5 (1975) pp. 1038–1041 MR0384857 MR0384858 Zbl 0333.20032 |
| [Pl4] | V.P. Platonov, "The Tannaka–Artin problem and reduced $K$-theory" Math. USSR Izv., 40 : 2 (1976) pp. 211–244 Izv. Akad, Nauk SSSR. Ser. Mat., 40 : 2 (1976) pp. 227–261 |
| [Pl5] | V.P. Platonov, "The infinitude of the reduced Whitehead group in the Tannaka–Artin problem" Math. USSR Sb., 29 (1976) pp. 167–176 Mat. Sb., 100 : 2 (1976) pp. 191–200 |
| [PlYa] | V.P. Platonov, V.I. Yanchevskii, "On the Kneser–Tits conjecture for unitary groups" Soviet Math. Dokl., 16 (1975) pp. 1456–1460 Dokl. Akad. Nauk SSSR, 225 : 1 (1975) pp. 48–51 Zbl 0343.16016 |
| [PrRa] | G. Prasad, M.S. Raghunathan, "On the Kneser–Tits problem" Math. Helv., 60 (1985) pp. 107–121 MR0787664 Zbl 0574.20033 |
| [Ti] | J. Tits, "Algebraic and abstract simple groups" Ann. of Math., 80 : 2 (1964) pp. 313–329 MR0164968 Zbl 0131.26501 |
How to Cite This Entry:
Kneser-Tits hypothesis. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Kneser-Tits_hypothesis&oldid=13473
Kneser-Tits hypothesis. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Kneser-Tits_hypothesis&oldid=13473
This article was adapted from an original article by V.I. Yanchevskii (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article