局部积分C—半群与抽象Cauchy问题（Ⅲ）

在文［１］的基础上，讨论局部积分Ｃ－半群在抽象Ｃａｕｃｈｙ问题上的应用。     

Γ半群的根同余-(2)

对于Γ－半群Ｓ，本文在［１］的基础上给出了如下结果：其中Ｔ为Ｓ的理想．     

D—正则半群上的同余

刻划Ｄ－正则半群上的如下同余：包括在Ｄ［Ｒ］中的最大同余、最大幂等元分离同余、（最小）基本强Ｄ－同余和群同余。     

具有正规中间幂等元的富足半群的构造

本文研究富足半群上中间幂等元的若干性质，并给出了具有正规中间幂等元的富半群的构造。作为推论，我们得到Ｂｌｙｔｈ和ＭｃＦａｄｄｅｎ［１］及Ｅ１－Ｑａｌｌａｌｉ［２］中相应结果。     

一类紧半群上概率测度卷积的弱收敛性

本文讨论紧半群上概率测度卷积幂的弱收敛性，将紧群上的Ｋａｗａｄａ－Ｉｔｏ型结果以相应的形式建立到一类紧半群上。本文的结论蕴含了［１］中的定理２．１．４与［２］中的定理１。     

广义a-结合BCI-代数

引入了广义ａ－结合ＢＣＩ－代数的概念，研究了ＢＣＩ－代数的ｐ－半单部分与广义ａ－结合部分的关系．并将ｐ－半单ＢＣＩ－代数的若干重要性质推广到广义ａ－结合ＢＣＩ－代数上．最后我们证明了每个广义ａ－结合ＢＣＩ－代数可确定一个交换偏序幺半群．本文结果表明文［１］的正则ＢＣＩ－代数与ｐ－半单ＢＣＩ－代数是一致的．     

关于poe—半群的双理想

推广正则半群中的双理想到ｐｏ－半群之中，利用ｐｏ－半群中的双理想研究了正则ｐｏｅ－半群、内正则ｐｏｅ－半群。得到了如下主要结果：①Ｓ为正则ｄｕｏ的充要条件是：Ｂ（ａｂ）＝Ｂ（ａ）∩Ｂ（ｂ），Ａ↓ａ、ｂ∈Ｓ；②Ｓ正则ｄｕｏ的充要条件为Ｓ为Ｂ－单序半群的半格；③Ｓ内正则的充要条件为：Ｒ∩Ｂ∩Ｌ包含于（ＬＢＲ］；④Ｓ正则且内正则的充要条件为：Ｒ∩Ｂ∩Ｌ包含于（ＢＲＬ］。     

一维双曲守恒方程组的Taylor-Galerkin有限元方法

１．引言 在文章［８］中,利用双曲守恒律的Ｈａｍｉｌｔｏｎ－Ｊａｃｏｂｉ方程形式,应用 Ｇａｌｅｒｋｉｎ有限元给出了求解一维双曲守恒律的计算方法．不同于间断有限元方法［２］、［３］和 Ｔａｙｌｏｒ－Ｇａｌｅｒｋｉｎ有限元方法［１］求解双曲守恒律,文章［８］采用连续 Ｇａｌｅｒｋｉｎ有限元求解双曲守恒律． 在文章［８］中,对差分方法和有限元方法求解双曲守恒律作了较为详细的讨论．同时在文章［８］中,采用积分变换,将双曲守恒律方程变成 Ｈａｍｉｌｔｏｎ－Ｊａｃｏｂｉ方程形式．由于 Ｈａｍｉｌｔｏｎ－Ｊａｃｏ…     

S—半正规与超可解

张继平在文［１］中利用Ｓ－拟正规的概念对广泛的一类有限群推广了Ｂｕｃｋｌｅｙ＾［２］的结果。本文将文［１］中定理的条件减弱成比“Ｓ－拟正规”更弱的“Ｓ－半正规”、证明了定理的结论仍成立。     

一类紧半群上概率测度卷积幂的弱收敛性

本文讨论紧半群上概率测度卷积幂的弱收敛性，将紧群上的Ｋａｗａｄａ－Ｉｔ６型结果以相应的形式建立到一类紧半群上．本文的结论蕴含了［１］中的定理２．１．４与［２］中的定理１．     

局部凸空间中的f-宽度

本文将赋范空间中的宽度推广到了局部凸空间,并得到了一些相应的结论.     

具有广义可行性余弦序列的E1?Ed型距离正则图

给出了具有广义可行性余弦序列的E₁?E_d型距离正则图的特征,并计算了这类图的交叉数.     

(GLn,GLm)-duality and symmetric plethysm

In [7] the author has given an exposition of the theory of invariants of binary forms in terms of a particular version of Classical Invariant Theory. Reflection shows that many aspects of the development apply also ton-ary forms. The purpose of this paper is to make explicit this more general application. The plethysms S’(S^p(ℂⁿ)) are computed quite explicitly forl = 2, 3 and 4. Partially supported by NSF Grant No. DMS 8506130.     

KI,k-FACTORIZATION OF BIPARTITE GRAPHS

in this paper a necesssary condition for a bipartite graph λK,to be K1-factorizable and a sufficient condition for kk to have a k -factonrization whenever k is a prime number are given.     

两个同类的E_((2))型空间线性等距映射的表现定理

该文得到了两个同类的E_((2))型空间单位球面间等距线性算子的表现定理,这是首次在非具体范数的情形下取得此类结果.     

关于C0半群的渐近展开

本文得到具有实际背景的一类Ｃ₀半群的渐近展开，它仅要求予解式满足一定条件．     

Strict Feasibility Conditions in Nonlinear Complementarity Problems

Strict feasibility plays an important role in the development of the theoryand algorithms of complementarity problems. In this paper, we establishsufficient conditions to ensure strict feasibility of a nonlinearcomplementarity problem. Our analysis method, based on a newly introducedconcept of -exceptional sequence, can be viewed as a unified approachfor proving the existence of a strictly feasible point. Some equivalentconditions of strict feasibility are also developed for certaincomplementarity problems. In particular, we show that aP_*-complementarity problem is strictly feasible if and only ifits solution set is nonempty and bounded.     

Beta算子的Lp-逼近

本文对于一类函数给出了Ｂｅｔａ算子Ｌ_p－逼近的特征刻画     

Generation of groups by rank-2 tori

Let k be a field of characteristic different from 2 and 3. In this paper, we study the number of rank-2 k-tori required (in fact exhibit such tori explicitly) for the generation of groups of type A₂, G₂ and F₄ arising from division algebras and subgroups of type D₄ of Aut(A), for A an Albert division algebra, over infinite perfect fields.     

Tits' Constructions of Jordan Algebras and F4 Bundles on the Plane

In this paper, constructions of Jordan algebras over commutative rings are given which place, within a general set-up, the classical Tits constructions of exceptional central simple Jordan algebras over fields. These are used to exhibit nontrivial Jordan algebra bundles over the affine plane with a given exceptional Jordan division algebra over k as the fibre. The associated principal F₄ bundles are shown to admit no reduction of the structure group to any proper connected reductive subgroup.