$C^*$-动力系统的Haagerup性质

令$A$是一个单位$C^*$-代数, $\tau$是它的一个态, $\alpha$是一个离散群$G$在$A$上保持$\tau$的作用. 首先, 我们通过考虑 $C^*$-代数的态, 推广了动力系统的Haagerup性质, 并且证明了动力系统有 Haagerup性质当且仅当它的约化交叉积有Haagerup性质. 然后, 我们引入了$G$在$A$上关于$\tau$的拟顺从作用. 最后, 利用上面的结果, 我们证明了如果$\alpha$是$G$在$A$上关于$\tau$的拟顺从作用, 那么$(A,\tau)$有Haagerup性质当且仅当$(A\rtimes_{\alpha,r}G,\tau'')$有Haagerup性质, 其中$\tau''$是由$\tau$诱导的$A\rtimes_{\alpha,r}G$上的态. 本文的主要结论推广了一些经典情况下的已知结果.     

笛卡尔乘积图里的最小k-路点覆盖

对于子集$S\subseteq V(G)$,如果图$G$里的每一条$k$路都至少包含$S$中的一个点,那么我们称集合$S$是图$G$的一个$k$-路点覆盖.很明显,这个子集并不唯一.我们称最小的$k$-路点覆盖的基数为$k$-路点覆盖数, 记作$\psi_k(G)$.本文给出了一些笛卡尔乘积图上$\psi_k(G)$值的上界或下界.     

有限群的$\Phi$-$\tau$-可补子群

假设$\tau$是一个子群算子, $H$是有限群$G$的一个$p$-子群. 令 $\bar{G}=G/H_{G}$且$\bar{H}=H/H_{G}$, 如果$\bar{G}$有一个次正规子群$\bar{T}$ 和一个包含于$\bar{H}$ 的$\tau$-子群$\bar{S}$满足$\bar{G}=\bar{H}\bar{T}$且$\bar{H}\cap\bar{T}\leq \bar{S}\Phi(\bar{H})$, 就称$H$是$G$的一个$\Phi$-$\tau$- 可补子群. 文章通过讨论群$G$的准素数子群的$\Phi$-$\tau$-可补性给出了超循环嵌入和$p$-幂零性的一些新的特征.     

图$P_m\times P_n, P_m\times C_n$ 和C_m\times C_n$}的邻点可区别全色数的注记

设 $G$ 是一个简单图. 设$f$是从$V(G) \cup E(G)$到 $\{1, 2,\ldots, k\}$的一个映射.对任意的 $v\in V(G)$, 设$C_f(v)=\{f(v)\}\cup \{f (vw)|w\in V(G),vw\in E(G)\}$ . 如果 $f$ 是一个 $k$-正常全染色, 且对 $u, v\in V(G),uv\in E(G)$, 有 $C_f(u)\neq C_f(v)$, 那么称 $f$ 为$k$-邻点可区别全染色 (简记为$k$-$AVDTC$). 设     

$P_m\times K_n$的邻点可区别全色数

设 $G$ 是简单图. 设$f$是一个从$V(G)\cup E(G)$ 到$\{1, 2,\cdots, k\}$的映射. 对每个$v\in V(G)$, 令 $C_f (v)=\{f(v)\}\cup \{f(vw)|w\in V(G), vw\in E(G)\}$. 如果 $f$是$k$-正常全染色, 且对任意$u, v\in V(G), uv\in E(G)$, 有$C_f(u)\ne C_f(v)$, 那么称 $f$ 为图$G$的邻点可区别全染色(简称为$k$-AVDTC).数 $\chi_{at}(G)=\min\{k|G$ 有$k$-AVDTC\}称为图$G$的邻点可区别全色数.本文给出路$P_m$和完全图$K_n$ 的Cartesion积的邻点可区别全色数.     

2-极大子群的$F_s$-拟正规性

$F$是一个群系. $G$的子群$H$在$G$中称为$F_s$-拟正规的,如果存在$G$的正规子群$T$,使得$HT$在$G$中是$s$-置换的并且$(H\cap T)H_G/H_G$包含在$G/H_G$的$F$超中心$Z^F_\infty(G/H_G)$中.本文利用$F_s$-拟正规子群研究了有限群的结构.获得了某些新的结果.     

“具有幂零局部子群的有限群”一文的注记

称有限群$G$为一个PN-群若 $G$非幂零群,且对$G$的每一个$p$-子群$P$, 或者$P$是$G$的正规子群, 或者$P \subseteq Z_\infty(G)$, 或者$N_G(P)$是幂零群, $\forall p \in \pi(G)$. 本文证明了PN-群是亚幂零群. 特别地, PN-群是可解的 且给出了PN-群结构定理的一个初等的、直观的、简洁的证明.     

KM伪度量空间中的模糊化收敛结构

分别提供了由KM伪度量到模糊化收敛结构和由模糊伪度量链到模糊化收敛结构的转化方法,并且证明了由KM伪度量诱导的模糊化拓扑进而诱导的模糊化收敛结构和KM伪度量直接诱导的模糊化收敛结构相同.而且,还证明了由KM伪度量诱导的模糊伪度量链进而诱导的模糊化收敛结构和由KM伪度量直接诱导的模糊化收敛结构相同.     

嵌入在克莱茵瓶上的图的最大亏格

设$\phi: G\rightarrow S$是图$G$在曲面$S$上的2 -胞腔嵌入. 若$G$的所有面都是依次相邻, 即嵌入图$G$的对偶图有哈密顿圈, 则将$\phi$称为一个面依次相邻的嵌入. 该文研究了在克莱茵瓶上有面依次相邻嵌入的图的最大亏格.     

最高阶元素个数为40的非可解群的分类

设$\varphi$为群${\rm Aut}(N)$的同态,记$H_\varphi\times N$为群$N$借助于群$H$的半直积.设$G$为有限不可解群,本文证明: 若$G$中最高阶元素个数为40, 则$G$同构于下列群之一:(1)~$Z_{4\varphi}\times A_5$,\,${\rm ker}\varphi=Z_2$; (2)~$D_{8\varphi}\times A_5,\,{\rm ker}\varphi=Z_2\times Z_2$; (3)~$G/N=S_5$, $N=Z(G)=Z_2$; (4)~$G/N=S_5$, $N=Z_2\times Z_2,\,N\cap Z(G)=Z_2$.     

A New Graph Structure of Commutative Semigroups

In this paper, a new zero-divisor graph $\overline{\G}(S)$ is defined and studied for a commutative semigroup $S$ with zero element. The properties and the structure of the graph are studied; for any complete graph and complete bipartite graph $G$, commutative semigroups $S$ are constructed such that the graph $G$ is isomorphic to $\overline{\G}(S)$.     

Sharper changes in topologies

Let be a Polish group, a Polish topology on a space , acting continuously on , with -invariant and in the Borel algebra generated by . Then there is a larger Polish topology on so that is open with respect to , still acts continuously on , and has a basis consisting of sets that are of the same Borel rank as relative to .

     

An Answer to a Question of Kelarev and Praeger on Cayley Graphs of Semigroups

In Europ. J. Combinatorics 24 (2003) 59--72, Kelarev and Praeger posed a question: Is it true that if $G$ is a semigroup with a subset $S$ such that Cay$(G,\{s\})$ is Aut16 February 2004In Europ. J. Combinatorics 24 (2003) 59--72, Kelarev and Praeger posed a question: Is it true that if $G$ is a semigroup with a subset $S$ such that Cay$(G,\{s\})$ is Aut$_{\{s\}}(G)$-vertex-transitive, for every $s\in S$, then the whole Cayley graph Cay$(G,S)$ is ColAut$_{S}(G)$-vertex-transitive, too? In this note, we give a negative answer to this problem and prove that in the cases of bands and completely simple semigroups the answer is positive.     

有限生成的幂零群的共轭分离性质

研究了有限生成的幂零群中元素的共轭分离问题.设ω表示全部素数组成的集合,π是ω的非空真子集,G是有限生成的幂零群,则下述三条等价:(i)如果x和y是G中的任意两个不共轭的元素,则x和y在G的某个有限p-商群中不共轭,其中p∈π;(ii)如果x和y是G中的任意两个不共轭的元素,则x和y在G的某个有限π-商群中不共轭;(iii)G的挠子群T(G)是π-群且G/T(G)是Abel群.同时举例说明:设G是有限生成的无挠幂零群,对于任意素数p,x和y都在G的有限p-商群G/G~p中共轭,但x和y在G中不共轭.     

函数空间上的模糊线性拓扑

本文给出了模糊拓扑向量空间（Ｘ，Ｗ）到（Ｙ，Ｊ）的函数族Ｆ上的模糊线性拓扑，证明了若值域空间（Ｙ，Ｊ）是（Ｑ）型的、局部凸的模糊拓扑向量空间，则（Ｆ，），也是型的、局部凸的模糊拓扑向量空间。     

Zebra Factorizations in Free Semigroups

Let $S$ be a semigroup of words over an alphabet $A$. Let $\Omega(S)$ consist of those elements $w$ of $S$ for which every prefix and suffix of $w$ belongs to $S$. We show that $\Omega(S)$ is a free semigroup. Moreover, $S$ is called separative if also the complement $S^c = A^+\setminus S$ is a semigroup. There are uncountably many separative semigroups over $A$, if $A$ has at least two letters. We prove that if $S$ is separative, then every word $w \in A^+$ has a unique minimum factorization $w = z_1z_2 \cdots z_n$ with respect to $\Omega(S)$ and $\Omega(S^c)$, where $z_i \in \Omega(S) \cup \Omega(S^c)$ and $n$ is as small as possible.     

On the Rank of the Semigroup TE(X)

${\cal T}_X $ denotes the full transformation semigroup on a set $ X $. For a nontrivial equivalence $E$ on $X$, let \[ T_E (X) =\{ f\in {\cal T}_X : \forall \, (a,b)\in E,\, (af,bf)\in E \} . \] Then $T_E (X) $ is exactly the semigroup of continuous selfmaps of the topological space $X$ for which the collection of all $E$-classes is a basis. In this paper, we first discuss the rank of the homeomorphism group $G$, and then consider the rank of $T_E (X)$ for a special case that the set $X$ is finite and that each class of the equivalence $E$ has the same cardinality. Finally, the rank of the closed selfmap semigroup $\Gamma(X)$ of the space $X$ is observed. We conclude that the rank of $G$ is no more than 4, the rank of $T_E (X)$ is no more than 6 and the rank of $\Gamma(X)$ is no more than 5.