有限秩的幂零群的自同构(Ⅱ)

设幂零群G=KP=PK,其中P是有限秩的幂零p-群,K是G的有限秩的p-自由的正规子群,p不属于K的谱Sp(K).设1=ζ0Gζ1G···ζcG=G是G的上中心列,α和β是G的两个p-自同构,把α,β在每个ζiG/ζi-1G上的诱导自同构分别记为αi和βi,又记Ii:=Im(αiβi-βiαi),则(i)如果每个Ii都是有限循环群,并且I:=(αβ(g))(βα(g))-1|g∈G是G的有限子群,那么α和β生成一个有限p-群;(ii)如果Ii或为有限循环群,或为拟循环p-群,或为Zpn⊕Zp∞对某自然数n,那么α和β生成一个可解的剩余有限p-群,它是有限生成的无挠幂零群被有限p-群的扩张;(iii)如果Ii或为有限循环群,或为拟循环p-群,或为Zpn⊕Zp∞,或为无挠的局部幂零群,或Ii有正规列1JiIi,其商因子分别为有限循环群、无挠的局部幂零群,或Ii=Zp∞⊕Ji,Ji为无挠的局部幂零群,或Ii有正规列1KiJiIi,其商因子分别为有限循环群、拟循环p-群、无挠的局部循环群,那么α和β生成一个可解的剩余有限p-群,它的幂零长度至多是3.特别地,当K是一个FC-群时,在情形(iii),α和β生成的群也是有限生成的无挠幂零群被有限p-群的扩张.此外,如果G=KP里,K是一个FC-群,对G的下中心列考虑了类似的问题,得到了"对偶"的结果.     

幂零李群上的薛定谔算子的加权估计

In this paper we consider the SchrSdinger operator -△G ＋ W on the nilpotent Lie group G where the nonnegative potential W belongs to the reverse H51der class Bq1 for some q1 ≥ D and D is the dimension at infinity of G. The weighted L^p -L6q estimates for the operators W^a（-△G ＋ W）^-β and W^a△G（-△G ＋ W）^-β are obtained.     

On Groups with a CC(n)-Subgroup

A subgroup H of G is a CC(n)-subgroup of G if |G: H| >n and |C_G(x): C_H(x)| ≤n for each element x ∈ H ? {1}. In this article, we study the finite p-groups with a nontrivial CC(p)-subgroup, and the locally nilpotent groups with a nontrivial CC(n)-subgroup.     

Lie *-Nilpotence of Group Rings

Let KG be the group ring of a group G over a field K. Let * be an involution of a group G extended linearly to the group ring KG. Suppose that G is a torsion group without 2-elements and K is a field with characteristic different from 2. We prove that KG is Lie *-nilpotent if and only if KG is Lie nilpotent.     

Subgroup separability of certain generalized free products of nilpotent-by-finite groups

In this paper, we show that certain generalized free products of nilpotent-by-finite groups are subgroup separable when the amalgamated subgroup is h× D where D is in the center of both factors.     

Constants and Darboux Polynomials for Tensor Products of Polynomial Algebras with Derivations

Abstract

Let d ₁ : k[X] → k[X] and d ₂ : k[Y] → k[Y] be k-derivations, where k[X] ? k[x ₁,…,x _n ], k[Y] ? k[y ₁,…,y _m ] are polynomial algebras over a field k of characteristic zero. Denote by d ₁ ⊕ d ₂ the unique k-derivation of k[X, Y] such that d| _k[X] = d ₁ and d| _k[Y] = d ₂. We prove that if d ₁ and d ₂ are positively homogeneous and if d ₁ has no nontrivial Darboux polynomials, then every Darboux polynomial of d ₁ ⊕ d ₂ belongs to k[Y] and is a Darboux polynomial of d ₂. We prove a similar fact for the algebra of constants of d ₁ ⊕ d ₂ and present several applications of our results.     

Generalization of Nilpotency of Ring Elements to Module Elements

We define nilpotent and strongly nilpotent elements of a module M and show that the set 𝒩 _s (M) of all strongly nilpotent elements of M over a commutative unital ring R coincides with the classical prime radical β _cl (M) the intersection of all classical prime submodules of M.     

Semiprimality and Nilpotency of Nonassociative Rings Satisfying x(yz) = y(zx)

In this article we study nonassociative rings satisfying the polynomial identity x(yz) = y(zx), which we call “cyclic rings.” We prove that every semiprime cyclic ring is associative and commutative and that every cyclic right-nilring is solvable. Moreover, we find sufficient conditions for the nilpotency of cyclic right-nilrings and apply these results to obtain sufficient conditions for the nilpotency of cyclic right-nilalgebras.     

c-capability of Lie algebras with the derived subalgebra of dimension two

The current article is devoted to classify the c-capability of finite dimensional nilpotent Lie algebras with the derived subalgebra of dimension two.