On Extensions of Right Symmetric Rings without Identity

Let us call a ring R (without identity) to be right symmetric if for any triple a,b,c,∈R?abc = 0 then acb = 0. Such rings are neither symmetric nor reversible (in general) but are semicommutative. With an idempotent they take care of the sheaf representation as obtained by Lambek. Klein 4-rings and their several generalizations and extensions are proved to be members of such class of rings. An extension obtained is a McCoy ring and its power series ring is also proved to be a McCoy ring.

Nilpotent Elements and Nil-Reflexive Property of Generalized Power Series Rings

Let R be a ring and (S,≤) a strictly ordered monoid. In this paper, we deal with a new approach to reflexive property for rings by using nilpotent elements, in this direction we introduce the notions of generalized power series reflexive and nil generalized power series reflexive, respectively. We obtain various necessary or sufficient conditions for a ring to be generalized power series reflexive and nil generalized power series reflexive. Examples are given to show that, nil generalized power series reflexive need not be generalized power series reflexive and vice versa, and nil generalized power series reflexive but not semicommutative are presented. We proved that, if R is a left APP-ring, then R is generalized power series reflexive, and R is nil generalized power series reflexive if and only if R/I is nil generalized power series reflexive. Moreover, we investigate ring extensions which have roles in ring theory.

Weakly Dual Rings

In This paper, the concept of weakly dual ring is introduced, which is a proper generalization of the dual ring. If R is a right weakly dual ring, then (1) Z(RR) = J(R); (2) If R is also a zero-division power ring, then R is a right AP-injective ring. In addition, some properties of weakly dual rings are given.

左室压力应变环技术评估瓣膜功能正常的二叶式主动脉瓣患者亚临床左室心肌功能

目的探讨超声心动图压力应变环技术(PSL)技术评价瓣膜功能正常的二叶式主动脉瓣(BAV)患者亚临床左室心肌功能。方法收集二叶式主动脉瓣患者作为病例组(BAV组,n=40),另选取主动脉瓣三叶瓣(TAV)的健康志愿者为对照组(TAV组,n=40)。各组获取2D-TTE参数,包括LVDd、LVDs、IVSd、LVpWd、MpA、LAD、LVEF,计算E/A、E/e′值。应用2D-STI技术获取左室GLS,应用PSL技术获取心肌做功参数,包括GWI、GCW、GWW及GWE。计算升主动脉AosI、Aortic Strain和AODSI。比较2组之间的差异,分析BAV组左室心肌做功参数与升主动脉Aortic Stain、AosI、AODSI参数的相关性。结果2D-TTE参数:BAV组较对照组E/A和E/e′参数均有所下降(P<0.05);BAV组较对照组GLS(绝对值)、GWI、GCW和GWE下降,GWW升高,2组比较差异有统计学意义(P<0.05);BAV组Aortic Stain、AODSI值较TAV组下降,AosI值较TAV组增加,2组比较差异有统计学意义(P<0.05)。BAV组中GWI、GCW与Aortic Stain、AODSI呈正相关(r分别为0.716、0.395、0.265、0.359,P<0.05)。结论PSL技术能够早期检出瓣膜功能正常的BAV患者亚临床左室心肌损害;瓣膜功能正常的BAV患者早期亚临床左室心肌损害可能与升主动脉结构或功能有关。

(g,e)-Symmetric Rings

Let R be a ring and e,g in E(R),the set of idempotents of R.Then R is called(g,e)-symmetric if abc=0 implies gacbe=0 for any a,b,c∈R.Clearly,R is an e-symmetric ring if and only if R is a(1,e)-symmetric ring;in particular,R is a symmetric ring if and only if R is a(1,1)-symmetric ring.We show that e∈E(R)is left semicentral if and only if R is a(1−e,e)-symmetric ring;in particular,R is an Abel ring if and only if R is a(1−e,e)-symmetric ring for each e∈E(R).We also show that R is(g,e)-symmetric if and only if ge∈E(R),geRge is symmetric,and gxye=gxeye=gxgye for any x,y∈R.Using e-symmetric rings,we construct some new classes of rings.

The Semigroup Structure of Left Clifford Semirings

In this paper, we generalize Clifford semirings to left Clifford semirings bymeans of the so-called band semirings. We also discuss a special case of this kind of semirings,that is, strong distributive lattices of left rings.

基于单个CSRR CRLH结构的双频带通滤波器

提出了一种基于单个互补开口谐振环(CSRR)的复合左右手(CRLH)结构双频带通滤波器,利用CSRR CRLH结构谐振特性,并通过延长、弯曲开路枝节线,引入新的传输零点同时缩小滤波器的尺寸,实现了滤波器双通带、高选择性和小型化.加工并测试了基于CSRR CRLH结构的双频带通滤波器的原型(尺寸为3 cm×3 cm),结果显示第一通带和第二通带的中心频率和插入损耗分别为1.9 GHz/1.7 dB和2.9 GHz/2.8 dB,在DC-1.05 GHz、2.20-2.50 GHz和3.45-4.00 GHz阻带范围内的带外抑制优于20 dB,实现了双频带通特性.

两例犬血管环异常的CT血管造影诊断和手术治疗效果

本文阐述了两例犬血管环异常(vascular ring anomaly,VRA)的CT血管造影(CT angiography,CTA)诊断及手术治疗。通过术前对患犬进行CTA诊断,进行经左侧第4肋间开胸动脉韧带切断的手术治疗,并在术后对病例1进行食道球囊扩张。CTA显示两只犬均存在持久性右主动脉弓(persistent right aortic arch,PRAA),并分别伴有右侧颈动脉异位发育和持久性左前腔静脉。手术治疗后,食道狭窄基本得到纠正,返流消失。CTA可对VRA进行更精确地诊断,并有助于制订具体手术方案;犬PRAA的手术治疗效果良好。

左室压力-应变环在鉴别免疫球蛋白轻链型心脏淀粉样变中的应用

目的:探讨左室压力-应变环在左室射血分数保留的免疫球蛋白轻链型心脏淀粉样变(AL-CA)患者早期诊断及鉴别诊断中的应用价值。方法:选出确诊为AL-CA并左室射血分数保留的患者32例,按年龄、性别匹配高血压左室肥厚(HLVH)患者28例。比较两组常规超声心动图(UCG)参数:室间隔与左室后壁厚度(IVST、LVPWT)、左室舒张末期内径(LVEDD)、收缩及舒张功能参数(LVEF、平均E/e')及左室压力-应变环相关参数,包括整体长轴应变(GLS)、整体做功指数(GWI)、整体有用功(GCW)、整体无用功(GWW)、整体做功效率(GWE),整体纵向应变达峰时间(PSD)。结果:(1)AL-CA组的IVST、LVPWT及平均E/e'均明显高于HLVH组;而AL-CA组的LVEDD与LVEF均明显低于HLVH组,P均<0.05。(2)AL-CA组的GLS、GWI、GCW、GWW均明显低于HLVH组;而AL-CA组的PSD明显高于HLVH组,P均<0.05。(3)ROC曲线分析显示在LVEF保留时,GWI绝对值低于1411.5 mmHg%与GCW绝对值低于1658 mmHg%可较好地鉴别AL-CA和HLVH(AUC均>0.9,P均<0.05)。结论:与HLVH相比,AL-CA患者UCG的常规及压力-应变环参数上均有显著差异;尤其是压力-应变环参数GWI与GCW在左室肥厚并LVEF保留患者中预测AL-CA的准确性更高。

The Comaximal Graphs of Noncommutative Rings

For a ring R(not necessarily commutative)with identity,the comaximal graph of R,denoted byΩ(R),is a graph whose vertices are all the nonunit elements of R,and two distinct vertices a and b are adjacent if and only if Ra+Rb=R.In this paper we consider a subgraphΩ_(1)(R)ofΩ(R)induced by R\Uℓ(R),where Uℓ(R)is the set of all left-invertible elements of R.We characterize those rings R for whichΩ_(1)(R)\J(R)is a complete graph or a star graph,where J(R)is the Jacobson radical of R.We investigate the clique number and the chromatic number of the graphΩ_(1)(R)\J(R),and we prove that if every left ideal of R is symmetric,then this graph is connected and its diameter is at most 3.Moreover,we completely characterize the diameter ofΩ_(1)(R)\J(R).We also investigate the properties of R whenΩ_(1)(R)is a split graph.

关于Gorenstein FP_(n)-内射模

引入(强)Gorenstein FP_(n)-内射模,得到了(强)Gorenstein FP_(n)-内射模的若干性质和刻画,并研究了左GFP_(n)-正则环的等价性质,证明了环R为左GFP_(n)-正则环当且仅当每个投射左R-模是FP_(n)-内射的且每个投射维数有限的n-表现左R-模都是投射的.

一种基于CSRR_CRLH TL的带通滤波器设计

提出一种基于探针加载的互补开口谐振环(CSRR)的复合左右手传输线(CRLH TL)结构。利用CSRR+CRLH结构的谐振特性,并通过延长CRLH耦合缝隙的长度以及增加CSRR中短路探针的数量,在引入传输零点的同时缩小了滤波器的尺寸。经过仿真优化,实现了滤波器宽频带、高选择性和小型化设计。加工了基于该结构的带通滤波器样机,样机整体尺寸为30 mm×15 mm×1.35 mm。测试结果表明,滤波器的中心频率及插入损耗分别为6.6 GHz和0.65 dB,3 dB带宽为9.3 GHz,在无线通信、导航等微波系统中具有良好的应用前景。

G-morphic环的一些结果

我们给出了G-morphic环的定义,证明了如下主要结果:对R中的任意幂等元e,如果R是左G-morphic环,则eRe也是左G-morphic环;每一个幺π-正则环是左(右)G-morphic环;每一个左G-morphic环是右GP-内射环.

异向介质研究进展

对异向介质领域最新的研究情况作了一个总体的回顾。首先介绍了异向介质的概念 ,其次概括叙述了理论研究和实验方面的进展 ,最后讨论了异向介质的应用前景以及目前这个领域的研究热点。

弱角环

设R为一个环,e2=e∈R,若对于左R-模Re的每个子模N,有ReN=N,则称R的子环eRe为弱角环,e是弱角幂等元.证明了如下结果:1若R为左MC2环,则弱角环eRe也是左MC2环;2若R为左min-abel环,则弱角环eRe也是左min-abel环;3若R为左mininjective环,则弱角环eRe也是左mininjective环;4若R为左universally mininjective环,则弱角环eRe也是左universally mininjective环.

微谐振环结构体内太赫兹增强效应

基于严格电磁场理论,给出了微型谐振环Ω形和Fishnet结构体内太赫兹波的严格表达式,并利用电磁场的边界条件分析了太赫兹波在微型谐振环Ω形和Fishnet结构体内空间分布的增强效应。数值模拟结果表明:谐振环金属条附近的电场大于磁场,金属条附近的电场相对其他区域明显要强得多,开口处表现更为突出,太赫兹波在Fishnet结构体内电磁场的峰位处电场和磁场分布关于x对称;电场的极值出现在大十字架的上下四个角,而磁场的极值则出现在小十字架的上下两端点。同时用电磁场传输线理论对该现象作出一定的物理解释。

广义Baskakov算子的加权逼近

引进了新的Jacobi权函数.首先,指出广义Baskakov算子在通常加权范数下是无界的;其次,引入一种新 的范数,讨论了广义Baskakov算子加Jacobi权逼近的收敛性;最后,借助于K 泛函给出了其在加权意义下的逼近 等价定理.

谐振环左手材料设计参数对太赫兹传输的影响

左手材料(LHM)的出现,为新型材料的探究和应用开辟了一个全新的领域。电磁波在左手材料中的传播特性已经被许多研究工作者广泛探索并得到了许多新结果,与此同时,太赫兹由于其独特性质也成为近年来研究的热点。归类总结了太赫兹波在典型LHM材料中的传输,并通过比较太赫兹波在不同设计的LHM中的传输,得出在LHM设计中,周期、分形、基板材料等参数对太赫兹传输的影响,这些传输特性在太赫兹波器件的制备方面有很大的应用前景。

WGC2环

证明了如下结果:①R是左WGC2环当且仅当每个左正则元是右可逆元;②R是左WGC2环当且仅当对每个左R-模M,每个a∈W(R),总有M=aM;③设R是左WGC2环,则Zl(R)■J(R);④R是co-Hopfian环当且仅当R是左WGC2环和直接有限环;⑤设R是左WGC2环和quasi-normal环,则R是co-Hopfian环;⑥R是除环当且仅当R是无零因子环和左WGC2环.