关于子基的正则空间和相对正则性

给出了关于子基的正则空间和相对正则性概念,研究了各种正则性之间的关系,证明了各种正则空间的充要条件,丰富了一般拓扑学中的正则空间和相对正则性理论．     

Clifford分析中κ-双正则函数的一些性质(英文)

k-双正则函数是双正则函数的推广。尽管许多k-双正则函数不是双正则函数,双正则函数的许多性质可以推广到k-双正则函数。本文研究了k-双正则函数的一些性质,包括Cauchy-Pompeiu公式,高阶Cauchy积分公式,平均值定理和级数的收敛定理。     

非汉字符号~*-覆盖正则半群的构造(Ⅰ)

本文刻画了■*-覆盖正则半群的结构,得到了弱覆盖正则半群和覆盖正则半 群的分类.作为其主要结论的应用, 我们还得到了(？)-覆盖完全正则半群, 弱覆盖完 全正则半群和覆盖完全正则半群的结构刻画.     

非汉字符号~*-覆盖正则半群的构造(Ⅰ)

本文刻画了■*-覆盖正则半群的结构,得到了弱覆盖正则半群和覆盖正则半 群的分类.作为其主要结论的应用, 我们还得到了(？)-覆盖完全正则半群, 弱覆盖完 全正则半群和覆盖完全正则半群的结构刻画.     

弱正则锥和正则锥的等价性

M.A.Kransnosel'skii在《Positive solutions of operator equations》一书中引入了正则锥和弱正则锥的概念,显然正则锥一定是弱正则锥。本文证明了弱正则锥并不比正则锥广泛,即:在一切Banach空间中弱正则锥是正则的,从而为非赋范线性拓扑空间中引入正则性提供了思路。     

关于Von Neumann正则环的一个问题

设A是结合环,如果α∈αAα,(?)α∈A,则称A是Von Neumann正则环,以下简称正则环.环A的理想ι称为A的正则理想,如果ι作为环是正则环.结合环A的元素α叫做双正则元素,如果α在A中生成的主理想(α)有单位元.所有元都是双正则元的环叫做双正则环.如果环A的理想ι是双正则环,测称ι是A的双正则理想.我们知道,对任意结合环A,存在最大的正则理想(?)(A)和最大的双正则理想B(A).正则环全体之类(?)是Amitsur—Kurosh意义下的一个根环类,而且是一个遗传类.关于最大的双正则理想,Szasz在[1]的定理44.9中给出了如下结论:     

算子和右端都近似给定的第一类算子方程的广义Arcangeli方法

本文利用正则化方法解算子和右端都是近似给定的第一类算子方程,利用广义Arcangeli准则决定正则参数,给出正则解的收敛性和渐近收敛阶估计,以及算子为Fredholm积分算子时的正则解的一致收敛性。     

闭正则模糊拟阵的子拟阵的正则性

研究了闭正则模糊拟阵的子拟阵的正则性等性质.得到了闭正则模糊拟阵的两种子拟阵的正则性等性质,即k-子拟阵为闭正则模糊拟阵,限制子拟阵不是闭正则模糊拟阵,给出了闭正则模糊拟阵的收缩拟阵为闭正则模糊拟阵等结论.     

具有拟理想正则*-断面的正则半群

本文提出了具有正则*-断面正则半群的概念，所给出的例子表明具有拟理想正则*-断面的正则半群类真包含了具有拟理想逆断面的正则半群类和正则*-半群类；最后刻画了具有拟理想正则*-断面的正则半群的结构．     

几乎半正则环（英文）

设R是环,J(R)是R的Jacobson根.R的元素a称为半正则元,如果存在正则元b∈R使得a-b∈J(R).环R称为几乎半正则环,如果对R的任意元a,有a或者1-a是半正则的.本文引入了几乎半正则环作为VNL-环和半正则环的推广.构造了一些例子,证明了几乎半正则环是置换环;将半正则环的许多性质推广到了几乎半正则环上.     

三次高斯和与Kloosterman和的线性递推公式

应用三角和方法以及高斯和的若干性质,研究三次高斯和与Kloosterman和的一类高次混合均值的计算问题,本文给出该混合均值的一个有趣的线性递推公式.同时,还应用该递推公式,得到三次高斯和与Kloosterman和的高次混合均值的一系列较强的渐近公式.     

A generating function of higher-dimensional Apostol-Zagier sums and its reciprocity law

We introduce higher-dimensional Dedekind sums with a complex parameter z, generalizing Zagier's higher-dimensional Dedekind sums. The sums tend to Zagier's higher-dimensional Dedekind sums as z→∞. We show that the sums turn out to be generating functions of higher-dimensional Apostol-Zagier sums which are defined to be hybrids of Apostol's sums and Zagier's sums. We prove reciprocity law for the sums. The new reciprocity law includes reciprocity formulas for both Apostol and Zagier's sums as its special case. Furthermore, as its application we obtain relations between special values of Hurwitz zeta function and Bernoulli numbers, as well as new trigonometric identities.     

Cotangent sums,a further generalization of Dedekind sums

In this article a simple proof for a reciprocity formula for sums of cotangent functions is presented. If the second arguments are zero, these sums are four times the original Dedekind sums. Subsequently, explicit expressions are derived. Finally, it is shown that the Berndt sums are special cases of these sums.     

两项指数和及两项特征和的混合均值

利用解析方法以及高斯和的性质研究一类二项指数和及二项特征和的混合均值问题,并给出一个精确的表示式.作为应用,给出该和式的一个渐近公式以及该和式与Dirichlet L-函数加权均值的一个较强的渐近公式.     

指数和与特征和的混合均值

本文利用三角和估计及其特征和的性质研究一类二项指数和与多项式特征和的混合均值的计算问题,并给出两个有趣的计算公式.     

Dedekind sums in function fields

Okada (J Number Theory, 130:1750–1762, 2010) introduced Dedekind sums associated to a certain A-lattice, and established the reciprocity law. In this paper, we introduce Dedekind sums for arbitrary A-lattice and establish the reciprocity law for them. We next introduce higher dimensional Dedekind sums for any A-lattice. These Dedekind sums are analogues of Zagier’s higher dimensional Dedekind sums. We discuss the reciprocity law, rationality and characterization of these sums.     

Kloosterman sum identities and low-weight codewords in a cyclic code with two zeros

We apply relations of n-dimensional Kloosterman sums to exponential sums over finite fields to count the number of low-weight codewords in a cyclic code with two zeros. As a corollary we obtain a new proof for a result of Carlitz which relates one- and two-dimensional Kloosterman sums. In addition, we count some power sums of Kloosterman sums over certain subfields.     

Some evaluation of q-analogues of Euler sums

In this paper, we discuss the analytic representations of q-Euler sums which involve q-harmonic numbers through q-polylogarithms, either linearly or nonlinearly, and give explicit formulae for several classes of q-Euler sums in terms of q-polylogarithms and q-special functions. Furthermore, we develop new closed form representations of sums of quadratic and cubic parametric q-Euler sums. Finally, we can find that the q-Euler sums are reducible to the classical Euler sums when q approaches 1.     

Some applications of smooth bilinear forms with Kloosterman sums

We revisit a recent bound of I. Shparlinski and T. Zhang on bilinear forms with Kloosterman sums, and prove an extension for correlation sums of Kloosterman sums against Fourier coefficients of modular forms. We use these bounds to improve on earlier results on sums of Kloosterman sums along the primes and on the error term of the fourth moment of Dirichlet L-functions.     

Generalized Cochrane sums and Cochrane-Hardy sums

In this paper, the generalized Cochrane sums and Cochrane-Hardy sums are defined. The arithmetic properties of the generalized Cochrane sums are studied, and the Cochrane-Hardy sums are expressed in terms of the generalized Cochrane sums. Analogues of Subrahmanyam's identity and Knopp's theorem are given and proved. Finally, the hybrid mean value of generalized Cochrane sums, Cochrane-Hardy sums and Kloosterman sums is studied, and a few asymptotic formulae are obtained.