论文信息 - On Chevalley Restriction Theorem for Semi-reductive Algebraic Groups and Its Applications

On Chevalley Restriction Theorem for Semi-reductive Algebraic Groups and Its Applications

An algebraic group is called semi-reductive if it is a semi-direct product of a reductive subgroup and the unipotent radical. Such a semi-reductive algebraic group naturally arises and also plays a key role in the study of modular representations of nonclassical finite-dimensional simple Lie algebras in positive characteristic, and some other cases. Let G ba a connected semi-reductive algebraic group over an algebraically closed field F and g = Lie(G). It turns out that G has many same properties as reductive groups, such as the Bruhat decomposition. In this note, we obtain an analogue of classical Chevalley restriction theorem for g, which says that the G-invariant ring F[g] is a polynomial ring if g satisfies a certain “posivity” condition suited for lots of cases we are interested in. As applications, we further investigate the nilpotent cones and resolutions of singularities for semi-reductive Lie algebras.

[1] A. Joseph. Second Commutant Theorems in Enveloping Algebras , 1977 .

[2] D. Nakano. Projective Modules over Lie Algebras of Cartan Type , 1992 .

[3] H. Strade. Simple Lie algebras over fields of positive characteristic , 2012 .

[4] G. Shen. GRADED MODULES OF GRADED LIE ALGEBRAS OF CARTAN TYPE(I)——MIXED PRODUCTS OF MODULES , 1986 .

[5] Zongzhu Lin,et al. Algebraic Group Actions in the Cohomology Theory of Lie Algebras of Cartan Type , 1996 .

[6] A. I. Kostrikin,et al. GRADED LIE ALGEBRAS OF FINITE CHARACTERISTIC , 1969 .

[7] Classification of finite dimensional simple Lie algebras in prime characteristics , 2006, math/0601380.

[8] H. Strade. Simple Lie Algebras over Fields of Positive Characteristic: I. Structure Theory , 2004 .

[9] F. Murnaghan,et al. LINEAR ALGEBRAIC GROUPS , 2005 .

[10] M. Duflo. Opérateurs différentiels bi-invariants sur un groupe de Lie , 1977 .

[11] Chaowen Zhang. Representations of the restricted Lie algebras of Cartan type , 2005 .

[12] Robert L. Wilson. Automorphisms of graded lie algebras op cartan type , 1975 .

[13] J. Humphreys. Conjugacy classes in semisimple algebraic groups , 1995 .

[14] C. Chevalley. Invariants of Finite Groups Generated by Reflections , 1955 .

[15] R. Richardson,et al. A generalization of the Chevalley restriction theorem , 1979 .