Rota-Baxter配对Lie模与Rota-Baxter配对Lie交叉模

首先引入Rota-Baxter配对Lie模概念,然后给出Rota-Baxter配对Lie模的一些构造,最后引入Rota-Baxter配对Lie交叉模概念,并在一个二维向量空间上构造Lie交叉模和Rota-Baxter配对算子.

CLASSIFICATIONS OF DUPIN HYPERSURFACES IN LIE SPHERE GEOMETRY

This is a survey of local and global classification results concerning Dupin hypersurfaces in S^(n)(or R^(n))that have been obtained in the context of Lie sphere geometry.The emphasis is on results that relate Dupin hypersurfaces to isoparametric hypersurfaces in spheres.Along with these classification results,many important concepts from Lie sphere geometry,such as curvature spheres,Lie curvatures,and Legendre lifts of submanifolds of S^(n)(or R^(n)),are described in detail.The paper also contains several important constructions of Dupin hypersurfaces with certain special properties.

具有高阶导子Lie-Yamaguti代数的上同调

研究具有高阶导子的Lie-Yamaguti代数,称之为LieYHDer对。首先给出LieYHDer对的上同调,然后研究了LieYHDer对的中心扩张,根据上同调考虑LieYHDer的形变。

Discussion on the Complex Structure of Nilpotent Lie Groups Gk

Consider the real, simply-connected, connected, s-step nilpotent Lie group G endowed with a left-invariant, integrable almost complex structure J, which is nilpotent. Consider the simply-connected, connected nilpotent Lie group Gk, defined by the nilpotent Lie algebra g/ak, where g is the Lie algebra of G, and ak is an ideal of g. Then, J gives rise to an almost complex structure Jk on Gk. The main conclusion obtained is as follows: if the almost complex structure J of a nilpotent Lie group G is nilpotent, then J can give rise to a left-invariant integrable almost complex structure Jk on the nilpotent Lie group Gk, and Jk is also nilpotent.

基于Lie群表示的保体积2D-3D点集配准算法

2D-3D点集配准的目标是寻找三维原始点集与二维目标投影点集之间的对应关系和最优变换.为了给出配准问题的解析解,避免投影引起的体积退化,提出基于Lie群表示的保体积2D-3D点集配准算法.首先,考虑投影矩阵和旋转矩阵的非交换性,引入Lie群表示,将配准问题形式化为一个Lie群优化问题.利用局部线性化方法,将Lie群优化问题转化为一个可计算的二次规划问题.其次,为了避免体积退化,考虑约束变换后的三维点集的投影与二维目标点集的投影具有相同的体积.为便于计算,引入Jensen-Bregman LogDet散度作为保体积正则项,将计算点集的体积差异转化为计算协方差矩阵之间的差异.然后,通过交替求解对应关系和最优变换,形成完整且可解的迭代策略.最后,在两个经典数据集上进行对比实验和消融实验,验证了该算法的精确性和有效性.

Lie-Yamaguti代数的相对微分算子

本文研究Lie-Yamaguti代数的相对微分算子.首先给出Lie-Yamaguti代数上相对微分算子的概念并给出等价刻画.随后,引入Lie-Yamaguti代数上相对微分算子的上同调.最后,讨论Lie-Yamaguti代数上相对微分算子的无穷小形变.

时间尺度上非迁移Emden方程的Lie对称性与守恒量

研究时间尺度上非迁移Emden方程的Lie对称性与守恒量。取得时间尺度上非迁移Emden方程力学函数,由力学体系的内在关联,Emden方程可表示为时间尺度上非迁移Lagrange方程、相空间Hamilton方程及广义Birkhoff方程;根据Lie理论,给出系统的确定方程,建立结构方程,得到相应守恒量。

Long-term trends in the abundance and breeding performance in Adélie penguins:the Argentine Ecosystem Monitoring Program

In this work,we report long-term trends in the abundance and breeding performance of Adélie penguins(Pygoscelis adeliae)nesting in three Antarctic colonies(i.e.,at Martin Point,South Orkneys Islands;Stranger Point/Cabo Funes,South Shetland Islands;and Esperanza/Hope Bay in the Antarctic Peninsula)from 1995/96 to 2022/23.Using yearly count data of breeding groups selected,we observed a decline in the number of breeding pairs and chicks in crèche at all colonies studied.However,the magnitude of change was higher at Stranger Point than that in the remaining colonies.Moreover,the index of breeding success,which was calculated as the ratio of chicks in crèche to breeding pairs,exhibited no apparent trend throughout the study period.However,it displayed greater variability at Martin Point compared to the other two colonies under investigation.Although the number of chicks in crèche of Adélie penguins showed a declining pattern,the average breeding performance was similar to that reported in gentoo penguin colonies,specifically,those undergoing a population increase(even in sympatric colonies facing similar local conditions).Consequently,it is plausible to assume a reduction of the over-winter survival as a likely cause of the declining trend observed,at least in the Stranger Point and Esperanza colonies.However,we cannot rule out local effects during the breeding season affecting the Adélie population of Martin Point.

Spherical Functions on Fuzzy Lie Group

Let G be a locally compact Lie group and its Lie algebra. We consider a fuzzy analogue of G, denoted by called a fuzzy Lie group. Spherical functions on are constructed and a version of the existence result of the Helgason-spherical function on G is then established on .

Discussion on the Homology Theory of Lie Algebras

Because homology on compact homogeneous nilpotent manifolds is closely related to homology on Lie algebras, studying homology on Lie algebras is helpful for further studying homology on compact homogeneous nilpotent manifolds. So we start with the differential sequence of Lie algebras. The Lie algebra g has the differential sequence E0,E1,⋯,Es⋯, which leads to the chain complex Es0→Δs0Ess→Δs1⋯→ΔsiEs(i+1)s→Δsi+1⋯of Esby discussing the chain complex E10→Δ10E11→Δ11⋯→Δ1r−1E1r→Δ1r⋯of E1and proves that Es+1i≅Hi(Es)=KerΔsi+1/ImΔsiand therefore Es+1≅H(Es)by the chain complex of Es(see Theorem 2).

广义几何Lie代数及其研究

为了探究Lie代数的一般拓展意义,构造了一般广义几何Lie括号与广义几何Lie代数,使得Lie代数是其一种特殊情况;然后讨论了它们的相关性质,证明了流形上向量场在广义几何Lie括号下的微分同胚,改进了Lie括号给出的结果。

Lie可容许代数的导子

讨论了 Lie可容许代数导子的基本性质 ,并给出了导子与其自身结构及其

三角代数上的2-局部Lie中心化子

设X和Y是实数域或复数域F上的Banach空间,用B(X)表示X上所有有界线性算子的代数.设A和B分别是B(X)和M的单位子代数,设M是单位(A,B)-双模,且左A-模与右B-模都是忠实的.证明了三角代数上的2-局部Lie中心化子是Lie中心化子.

Hom-3-Lie代数上的积结构和复结构

为了研究Hom-3-Lie代数上的积结构和复结构,利用类似于研究3-Lie代数的方法及相关Lie代数理论,给出了Hom-3-Lie代数上的积结构和复结构存在的充要条件,得到了4类特殊的积结构和复结构,并在积结构和复结构间加了一个相容性条件,从而引进了Hom-3-Lie代数上的复积结构。

B(X)上的(m,n)-Lie中心化子

设X是实数域或复数域F上维数大于1的Banach空间,Ф:B(X)→B(X)是一个可加映射。证明了如果存在正整数m,n使得(m+n)Ф([A,B])=m[Ф(A),B]+n[A,Ф(B)]对任意A,B∈B(X)且AB=P(其中P∈B(X)是一个固定的非平凡幂等元)成立,则存在λ∈F及在AB=P的换位子上为零的可加映射h:B(X)→F使得对任意A∈B(X),有Ф(A)=λA+h(A)I.

YTSF方程的Lie点对称群及其非行波动力学行为

获得Yu-Toda-Sasa-Fukuyama方程(简称为YTSF方程)含5个任意函数的Lie对称,对YTSF方程作了3种情况的对称约化,分别采用Jacobi椭圆函数展开法、CRE展开法和变量分离法求解3个对称约化方程,得到非行波周期解、孤子解、相容Riccati方程解与和式变量分离解,结合数字技术分析YTSF方程的动力学局域激发模式.这些结果展示了该方程可积性和动力学特性的多样性,实证了多种非线性数学方法有机结合的有效性.

分数阶奇异系统的Lie对称性与守恒量

对称性与守恒量可以简化动力学问题从而进一步求出力学系统的精确解,这样更加有利于研究动力学行为.分数阶模型相比于整数阶模型,能够描述复杂系统的动力学过程,因此在分数阶模型下研究对称性与守恒量是不可或缺的.首先介绍两个分数阶奇异系统,一个系统包含混合整数和Caputo分数阶导数,另一个系统仅含Caputo分数阶导数.由两个分数阶奇异系统分别给出两个分数阶固有约束,并给出对应的分数阶约束Hamilton方程.然后,基于微分方程在无限小变换下的不变性,给出了分数阶约束Hamilton方程Lie对称性的定义,导出了相应的确定方程,限制方程和附加限制方程.第三,建立并证明了两个分数阶约束Hamilton系统的Lie对称性定理,得到了相应的分数阶约束Hamilton系统的Lie守恒量.在特定条件下,本文所得结果可以退化为整数阶约束Hamilton系统的Lie守恒量.最后通过两个算例来说明此结果的应用.

包含时间分数阶导数与整数阶导数的一类微分方程Lie对称

针对同时含有时间整数阶导数和Caputo分数阶导数的一类常微分方程,采用Lie对称理论,给出了该分数阶微分方程的Lie对称分类。据我们所知,研究分数阶导数Lie对称的人们主要考虑包含时间分数阶导数和空间变量的整数阶导数的微分方程。为此,本文中,通过Caputo分数阶的相关性质Caputo分数阶微分方程的Lie理论,给出了所考虑的微分方程拥有的对称定理,对部分情况给出了原方程的Lie对称约化。

套代数上零点广义Lie可导映射

设N是Hilbert空间H上的一个非平凡套,f是套代数AlgN上的一个连续广义零点Lie-可导映射,d是套代数AlgN上的一个连续Lie-导子。证明了,如果A,B∈AlgN且AB=0有f([A,B])=f(A)B-f(B)A+Ad(B)-Bd(A),则f([A,B])=f(A)B-f(B)A+Ad(B)-Bd(A),A,B∈AlgN。

基于涡量动力学与Lie导数方法的二维扇环形旋转流场的研究

理论方面,本文提出速度场物质导数的Lie导数与Lie导数补的分解,并将其用于辨识二维流场的剪切与旋转区域,可作为辨识漩涡/旋转区域的一种新方法;应用基于曲面主方向的正交系的非完整基理论发展可变形壁面上的涡量动力学,获得了壁面上涡量与涡量流的新表达式,这种表达式充分揭示了力学与几何之间的关系。数值方面,基于显含时间的曲线坐标系的涡量-流函数方法,研究二维封闭腔体做匀角速度旋转时腔内不可压缩流场的时空演化,腔体形态包括规则扇环形、波纹壁扇环形、可变形壁面扇环形。基于流场分析,归纳了腔体内部大尺度漩涡的生成机理与流场随时间的演化特征。