关于分次本质右理想

设 Ｒ是 Ｇ－分次,本文讨论了环 Ｒ的相关环 Ｒ,Ｒ＃ Ｇ^*, Ｒｅ, Ｑ（Ｒ）, Ｒ^G, Ｒ*Ｇ及 Ｒ的正规化扩张Ｓ的非奇异性,右一致性,右基座之间的关系．当Ｒ_Ｒ是ＹＪ－内射模时,证明了Ｊ（Ｒ）＝Ｚ（Ｒ）。     

基础R0-代数的性质及在L*系统中的应用

研究了王国俊教授建立的模糊命题演算的形式演绎系统L^*和与之在语义上相关的R₀-代数,提出了基础R₀-代数的观点并讨论了其中的一些性质,在将L^*系统中的推演证明转化为相应的R₀-代数中的代数运算方面作了一些尝试,作为它的一个应用,证明了L^*系统中的模糊演绎定理。     

H*－有理模和右Smash积A＃HRH*

本文对Ｈ^*上的有理模Ｍ做了一些讨论，刻划了此类模的某些性质，并利用这些性质得到了右Ｓｍａｓｈ积Ａ＃_H^R［ｋＧ］^*上模Ｍ是完全可约模的条件。     

局部对偶的黎曼空间和引力瞬子解

四维正定黎曼空间R₄能局部地生成两个SU₂规范场和,如果,至少有一个具有自对偶性或反自对偶性,那末空间称为具局部对偶性的.我们证明它们是Einstein空间、数量曲率为0的共形平坦空间以及只R⁺⁺=0(或R^--=0)的空间.文中得出了R⁺⁺=0(R^--≠0)的一类黎曼线素.对曲率张量平方可积的情形,作出了规范场作用量,Euler示性数,Pontrjagin示性数之间的一个不等式,证明它的等号在而且只在R₄具局部对偶性时达到,这结果改进了文献[7]中关于引力瞬子解的研究.并以Hitchin关于4维紧致Einstein形流的一个不等式作为特殊情况.     

Oppenheim不等式推广的简单证明

设Ｅｕｃｌｉｄ空间ｎ＋１元点集Ａ，Ｂ及其度量和Ｃ所构成的单形的体积、外接球半径分别为Ｖ_１，Ｖ₂，Ｖ和Ｒ_１，Ｒ₂，Ｒ．本文给出不等式V^2/n≥V₁^2/n+V₂^2/n,R²≤R₁²+R₂²一种简单的证法．该     

R3内具给定平均曲率的闭曲面

设H^*是R³内某个开区域内的实值函数,在H^*上加两个条件,在_R³内能找到同胚于给定闭曲面(任意亏格)的曲面,其平均曲率由H^*给出。     

极大高阶交换子的端点估计

该文主要确立了当b∈BMO 时, 极大高阶奇异积分算子交换子T_{b, m}* 满足如下不等式 |{y∈Rⁿ:T_{b, m}*f(y)>λ}|≤C||b||^m_BMO∫_Rⁿ|f(y)|/λ (1+log⁺|f(y)|/λ)^mdy 且T_{b, m}* 在L^p(Rⁿ)(1 < p <∞上有界.     

关于g-函数的一些性质

本文得到的主要结果是:当f(x)∈BMO(Rⁿ)时,f的g-函数或者几乎处处发散,或者几乎处处取有限值;如属后者,则g(f)∈BMO(Rⁿ),且||g(f)||_*c||f||_*,而c只与空间维数有关。     

一类半参数回归模型的估计理论

考虑半参数回归模型Y=X’β+g(T)+e,其中(X,T)为取值于R^p×[0,1]上的随机向量,β为p×1未知参数向量,g为定义于[0,1]上的未知函数,e为随机误差,Ee=0,Ee²=σ²>0,且(X,T)与e独立。本文综合最近邻和最小二乘的方法定义了β,g和σ²的估计量,g_n^*和。在适当条件下证明了和的渐近正态性,并得到了g_n^*的最优收敛速度。     

局部域上的局部Hardy空间

文献［１］，［２］，［３］中讨论了Ｒ^ｎ上的局部Ｈａｒｄｙ空间，并利用乘子定理证明了ｈ_ｐ（Ｒ^ｎ）＝Ｆ_p.2⁰（Ｒ^ｎ）．本文利用Ｃｈｅｂｙｓｈｅｖ等式及正则函数的性质证明了在局部域上有类似的结果ｈ_ｐ（Ｒ^ｎ）＝Ｆ_p.2⁰（Ｒ^ｎ），从而建立起函数空间之间的关系，并由此给出一个乘子定理．     

Duality results for perturbation classes of semi-Fredholm operators

The perturbation classes problem for semi-Fredholm operators asks when the equalities SS(X,Y)=PF₊(X,Y){\mathcal{SS}(X,Y)=P\Phi_+(X,Y)} and SC(X,Y)=PF_-(X,Y){\mathcal{SC}(X,Y)=P\Phi_-(X,Y)} are satisfied, where SS{\mathcal{SS}} and SC{\mathcal{SC}} denote the strictly singular and the strictly cosingular operators, and PΦ₊ and PΦ₋ denote the perturbation classes for upper semi-Fredholm and lower semi-Fredholm operators. We show that, when Y is a reflexive Banach space, SS(Y^*,X^*)=PF₊(Y^*,X^*){\mathcal{SS}(Y^*,X^*)=P\Phi_+(Y^*,X^*)} if and only if SC(X,Y)=PF_-(X,Y),{\mathcal{SC}(X,Y)=P\Phi_-(X,Y),} and SC(Y^*,X^*)=PF_-(Y^*,X^*){\mathcal{SC}(Y^*,X^*)=P\Phi_-(Y^*,X^*)} if and only if SS(X,Y)=PF₊(X,Y){\mathcal{SS}(X,Y)=P\Phi_+(X,Y)}. Moreover we give examples showing that both direct implications fail in general.     

Unitary similarity of projectors

Summary We deal with linear operators acting in a finite dimensional complex Hilbert space. We show that there exists a simple canonical form for projectors (not necessarily orthogonal) under unitary similarity. As a consequence we obtain a simple test for unitary similarity of projectors. IfP is a projector we show thatP andP ^* are unitarily similar. We also determine the isomorphism type of the algebra generated by the projectorsP andP ^*.Dedicated to the memory of Alexander M. Ostrowski on the occasion of the 100th anniversary of his birth     

Homomorphisms and composition operators on algebras of analytic functions of bounded type

Let U and V be convex and balanced open subsets of the Banach spaces X and Y, respectively. In this paper we study the following question: given two Fréchet algebras of holomorphic functions of bounded type on U and V, respectively, that are algebra isomorphic, can we deduce that X and Y (or X^* and Y^*) are isomorphic? We prove that if X^* or Y^* has the approximation property and H_wu(U) and H_wu(V) are topologically algebra isomorphic, then X^* and Y^* are isomorphic (the converse being true when U and V are the whole space). We get analogous results for H_b(U) and H_b(V), giving conditions under which an algebra isomorphism between H_b(X) and H_b(Y) is equivalent to an isomorphism between X^* and Y^*. We also obtain characterizations of different algebra homomorphisms as composition operators, study the structure of the spectrum of the algebras under consideration and show the existence of homomorphisms on H_b(X) with pathological behaviors.     

On generalised Putnam—Fuglede theorems

LetB(H) denote the algebra of operators on the Hilbert spaceH, and letP denote the class ofAB(H) which are such that the restriction ofA to an invariant subspace is inP wheneverAP and which satisfy the property, henceforth called property (P 2), that if the restriction ofA to an invariant subspace is normal, then the subspace reducesA. GivenP-classesP ₁ andP ₂, the pair (P ₁,P ₂) is said to satisfy the (PF)-property if givenAP ₁ andB ^* P ₂ such thatAB=XB for someXB(H), we haveA ^* X=XB ^* . Generalising the (classical) Putnam—Fuglede theorem, it is shown here that the pair (P ₁,P ₂) has the (PF)-property if and only if, givenAP ₁ andB ^*P ₂ such thatAX=XB for some quasi-affinityXB(H), the following conditions hold: (i)B ^* is normal impliesA is normal; (ii)A has a normal direct summand impliesB ^* has a normal direct summand; (iii)A andB ^* pure impliesX is non-existent. An interestingP-class is the classC ₀ of contractions withC ₀ completely non-unitary parts which satisfy property (P 2). AssumingH to be separable, it is shown that ifC ₁ denotes thoseA C ₀ for which the defect operatorsD _A =(1–A^*A)^1/2 is of Hilbert—Schmidt class and for which either the pure part ofA has empty point spectrum or the eigen-values ofA are all simple, then the pair (C ₀,C ₁) has the (PF)-property. The classC ₁ defines aP-class; a crucial role in the proof of this statement is played by the interesting result that aC ₀ contraction with spectrum on the unit circle can not satisfy property (P 2). Applications of these results are considered, amongst them that ifA andB are quasi-similar hyponormal contractions such that the pure part ofA has finite multiplicity andD _B is of Hilbert —Schmidt class, then their normal parts are unitarily equivalent and their pure parts are quasi-similar.     

Signature Operators and Surgery Groups over C*-algebras

Let A be a unital complex C^* algebra, L^*(A) the projective symmetric surgery groups, and K_*(A) topological K theory. We define groups B^*(A) of bordism classes of Fredholm complexes over A with Poincaré duality. These generalize the de Rham complex. It is shown that there are isomorphisms B^*(A)K_* (A) and B^*(A) L_*(A) given by abstract versions of the signature operator and symmetric signature. The remaining side of a triangle is formed by an isomorphism due to Mienko.     

Identification of the Time Derivative Coefficient in a Fast Diffusion Degenerate Equation

In this paper, we deal with the identification of the space variable time derivative coefficient u in a degenerate fast diffusion differential inclusion. The function u is vanishing on a subset strictly included in the space domain Ω. This problem is approached as a control problem (P) with the control u. An approximating control problem (P _ε ) is introduced and the existence of an optimal pair is proved. Under certain assumptions on the initial data, the control is found in W ^2,m (Ω), with m>N, in an implicit variational form. Next, it is shown that a sequence of optimal pairs (u_e^*,y_e^*)(u_{\varepsilon }^{\ast },y_{\varepsilon }^{\ast }) of (P _ε ) converges as ε goes to 0 to a pair (u ^*,y ^*) which realizes the minimum in (P), and y ^* is the solution to the original state system.     

The Atiyah-Segal completion theorem for C*-algebras

We generalize the Atiyah-Segal completion theorem to C ^*-algebras as follows. Let A be a C ^*-algebra with a continuous action of the compact Lie group G. If K _* ^G (A) is finitely generated as an R(G)-module, or under other suitable restrictions, then the I(G)-adic completion K _* ^G (A) is isomorphic to RK _*([A C(EG)]^G), where RK _* is representable K-theory for - C ^*-algebras and EG is a classifying space for G. As a corollary, we show that if and are homotopic actions of G, and if K _*(C ^* (G,A,)) and K _*(C ^* (G,A,)) are finitely generated, then K _*(C ^*(G,A,))K_*(C ^* (G,A,)). We give examples to show that this isomorphism fails without the completions. However, we prove that this isomorphism does hold without the completions if the homotopy is required to be norm continuous.This work was partially supported by an NSF Graduate Fellowship and by an NSF Postdoctoral Fellowship.     

Infinite words and permutation properties

Summary In contrast with the theorem of Restivo and Reutenauer, which in its nontrivial part says that each property P_n (n>-2) ensures the finiteness of a finitely generated periodic semigroup, we prove that no property P _n ^* (n≥3) can do this     

Simple infinite-dimensional quotients of the group C-algebras ofcertain discrete 6-dimensional nilpotent groups

We study here the simple infinite-dimensional quotients of the group C^*-algebras of two discrete6-dimensional nilpotent groups H_6,1 and H_6,2 as the higher-dimensional analogues of the irrational rotation algebras. P Milnes and S. Walters, jointly and individually, have studied the lower-dimensional cases in a series of papers, and also have started the study of some other 6-dimensional groups. For G = H_6,1 or H_6,2, we can determine the crossed product presentations for the simple quotients of C^* (G), and matrix representations for those arising from non-faithful representations of the groups. The isomorphism classifications of these quotients are obtained using K-theoretic tools, namely, the K-groups and the range of trace on K₀. This marks the first use of K-theory in the classification of quotients for 6-dimensional groups.     

The smallness problem for -algebras

Akemann showed that any von Neumann algebra with a weak^* separable dual space has a faithful normal representation on a separable Hilbert space. He posed the question: If a C^*-algebra has a weak^* separable state space, must it have a faithful representation on a separable Hilbert space? Wright solved this question negatively and showed that a unital C^*-algebra has the weak^* separable state space if and only if it has a unital completely positive map, into a type I factor on a separable Hilbert space, whose restriction to the self-adjoint part induces an order isomorphism. He called such a C^*-algebra almost separably representable. We say that a unital C^*-algebra is small if it has a unital complete isometry into a type I factor on a separable Hilbert space. In this paper we show that a unital C^*-algebra is small if and only if the state spaces of all n by n matrix algebras over the C^*-algebra are weak^*-separable. It is natural to ask whether almost separably representable algebras are small or not. We settle this question positively for simple C^*-algebras but the general question remains open.