Асосий контентга ўтиш
AkademIndex

Маҳсулотлар

Ишлаб чиқувчилар учун

AkademBaseЭкотизим учун очиқ API
Мақола

Le rang du systeme lineaire des racines d'une algebre de lie rigide resoluble complexe

Bermudez Jose Maria AncocheaDep. Geometria y topologia , Facultad de Matematicas , Universidad Complutense, Madrid, 28040, EspagneMichel GozeLaboratoire de Mathematiques , Faculte des Sciences et Techniques , 32, rue du Grillenbreit , Colmar, 68000, France
1992fr
ABI

Аннотация

One knows that a solvable rigid Lie algebra is algebraic and can be written as a semidirect product of the form g=T⊕n if n is the maximal nilpotent ideal and T a torus on n . The main result of the paper is equivalent to the following: If g is rigid then T is a maximal torus on n . The authors then study algebras of this form where n is a filiform nilpotent algebra. A classification of this law is given in the case in which the weights of T are kα , with 1≤k≤n=dimn .

Ҳали таржима қилинмаган

Идентификаторлар

Иқтибослар ва манбалар

3 та иқтибос0 та фойдаланилган манба