Non-linearizable Algebraic Group-Actions on An

We give a decomposition of the actions of generalized Levi factors of a simple algebraic group on the Lie algebra of the algebraic group. ᮊ 1997 Academic Press J ␣ subgroup corresponding to ␣. Then L and L are closed connected reductive subgroups of G, L is the Levi factor of a parabolic subgroup, ˜

Let G be a group, F a field, and A a finite-dimensional central simple algebra over F on which G acts by F-algebra automorphisms. We study the subalgebras and ideals of A which are preserved by the group action. We prove a structure theorem and two classification theorems for invariant subalgebras u

We extend a recent ergodic theorem of A. Nevo and E. Stein to the non-commutative case. Let \ be a faithful normal state on the von Neumann algebra A. Let [a i ] r i=1 generate F r , the free group on r generators, and let [: i ] r i=1 be V-automorphisms of A which leave \ invariant. Define , to be

Let k be an algebraically closed field and G a linear algebraic group over k acting rationally on a k-algebra V. Generalizing work of Moeglin and Rentschler in characteristic zero, we study the action of G on the spectrum of rational ideals of V. The main result is the following. Suppose that V is s

We study rational actions of a linear algebraic group G on an algebra V, and the Ž . Ž induced actions on Rat V , the spectrum of rational ideals of V a subset of Ž . . Spec V which often includes all primitive ideals . This work extends results of Moeglin and Rentschler to prime characteristic, oft