黎曼可积函数列的极限理论及应用

对黎曼可积函数列的极限函数的可积性进行讨论．运用黎曼积分自身的理论依次证明了：一致收敛函数列的极限函数的黎曼可积性,黎曼积分下的控制收敛定理和广义积分下的控制收敛定理。并给出了一些应用例子．     

全变差有界函数列的一致(R)可积性

给出了一致有界单调函数列一致可积性定理 ,由此得出全变差序列有界的收敛函数列的一致可积性 .说明了该结论可判断一些非一致收敛函数列的逐项积分性质 .     

复合函数极限的应用

利用复合函数极限的运算法则给出收敛数列与其子列的关系、海涅定理以及数列重排的另一种证明,把三个重要的定理归结为复合函数极限的应用,将大学数学里三个重要但理解起来相对困难的定理纳入统一简单的框架.     

可测函数序列关于弱收敛概率测度序列积分的极限定理

研究了可测函数序列关于弱收敛概率测度序列积分的极限定理及其控制收敛定理,并给出了概率测度弱收敛的若干新的等价条件.     

判别函数项级数不一致收敛的一种方法

本文利用一致收敛函数列的一个性质,给出了判别函数项级数（包括函数列）不一致收敛的一种方法;这种方法为教科书所忽视,然而它对于一类函数列与函数项级数来说,却十分有用;特别对于一类函数项级数,判别的方法和技巧都有它们的特点,有一定启发性;１　一致收敛函数列的一个性质一致收敛函数列有一个不为人注意的性质：命题１　设各项连续的函数列｛Ｓｎ（ｘ）｝在区间Ｉ上一致收敛于Ｓ（ｘ）,则对Ｉ中任何以ｘ０（ｘ０∈Ｉ）为极限的数列｛ｘｎ｝,都有ｌｉｍｎ→∞Ｓｎ（ｘｎ）＝Ｓ（ｘ０）．（１）这个性质仅在某些数学分析教科书…     

广义函数Denjoy积分的收敛性问题

本文讨论广义函数De njoy积分的收敛性问题.首先给出了广义Denjoy可积函数空间中强收敛、弱收敛、弱~*收敛和广义函数Denjoy积分收敛的关系;证明拟一致收敛是广义函数Denjoy积分收敛的一个充分必要条件;最后指出了Denjoy可积广义函数列弱~*收敛与强收敛等价当且仅当原函数等度连续.     

Heine定理的等价命题及其应用

一、引言在国内流行的《数学分析》教材中 ( [1 ]～ [3 ]) ,均给出了描述函数极限与数列极限之间关系Heine定理或称归纳原则 :定理 1 ( Heine定理 )　设函数 f ( x)在 u。( a)有定义 ,则 limx→ af ( x) =b 对任意收敛于 a的数列{ an} u。( a)有 limn→∞ f ( an) =b。众所周知 ,Heine定理是沟通函数极限与数列极限之间的桥梁 ,在极限理论和应用中 ,占有非常重要的地位。但是 ,该定理的充分性较强 ,运用中有一定的局限性。1 985年 ,文献 [4 ]减弱了 Heine定理的充分性条件 ,给出了与 Heine定理等价的如下命题 :定理 2 [4 ]　设函数 f ( x…     

实Clifford分析中κ-正则函数列的性质

在解析函数列收敛性定理的基础上,首先给出了k-正则函数列的内闭一致有界及内闭一致收敛的概念,然后讨论了k-正则函数列的一些性质.     

收敛函数列一致(R)可积的一个必要条件

给出了收敛的一致(R)可积函数列的一致有界性定理,并指出一致有界是收敛的(R)可积函数列一致(R)可积的必要条件,但不是充分条件.     

Fuzzy区间值函数的含参量积分及一致收敛性

在一元实函数无穷积分定义的基础上,定义了含参量Fuzzy区间值函数的正常积分和无穷积分,给出了含参量无穷积分一致收敛的定义和判定定理.     

集值条件期望的一个Fatou型引理

本文讨论了Ｂａｎａｃｈ空间只订合序列弱收敛的一些性质，给出了集值条件期望的表示定量，证明了集值条件期望在弱收敛意义下的Ｆａｔｏｕ型引理和控制收敛定理，并由此得到了一个可积选择空间的收敛定理。     

NA序列中心极限定理的收敛速度

本文对NA（NegativelyAssociated）序列建立了中心极限定理的一致收敛速度，只要其三阶矩有限及描述NA序列协方差结构的一个系数u（n）被负指数序列所控制，而无需平稳性便获得了其收敛速度O（n(-1/2)logn）。     

Local Functional Limit Theorems of Increments for Brownian Motion

In this paper, we present a local Csrg–Révész type functional limit theorem for increments of Brownian motion and give its convergence rate. The results also extend the functional forms of Lévy's modulus of continuity for Brownian motion.     

Convergence theorems for the Birkhoff integral

We give sufficient conditions for the interchange of the operations of limit and the Birkhoff integral for a sequence (f _n ) of functions from a measure space to a Banach space. In one result the equi-integrability of f _n ’s is involved and we assume f _n → f almost everywhere. The other result resembles the Lebesgue dominated convergence theorem where the almost uniform convergence of (f _n ) to f is assumed.     

A Local Limit Theorem for a Family of Non-Reversible Markov Chains

By proving a local limit theorem for higher-order transitions, we determine the time required for necklace chains to be close to stationarity. Because necklace chains, built by arranging identical smaller Markov chains around a directed cycle, are not reversible, have little symmetry, do not have uniform stationary distributions, and can be nearly periodic, prior general bounds on rates of convergence of Markov chains either do not apply or give poor bounds. Necklace chains can serve as test cases for future techniques for bounding rates of convergence.     

A simple proof of diffusion approximations for LBFS re-entrant lines

For a re-entrant line operating under the last-buffer-first-serve service policy, there have been two independent proofs of a heavy traffic limit theorem. The key to these proofs is to prove the uniform convergence of a critical fluid model. We give a new proof for the uniform convergence of the fluid model.     

有界闭区间上连续函数列一致收敛的充要条件

判别函数列一致收敛的方法有函数列一致收敛定义、Cauchy一致收敛准则、limn→∞supx∈D|fn(x)-f(x)|=0及Dini定理,本文由函数列的等度连续性,可得出几个有界闭区间上连续函数列一致收敛的充要条件,推广了Dini定理.     

Faedo–Galerkin Approximation of Solution for a Nonlocal Neutral Fractional Differential Equation with Deviating Argument

In this work, we study a class of nonlocal neutral fractional differential equations with deviated argument in the separable Hilbert space. We obtain an associated integral equation and then, consider a sequence of approximate integral equations. We investigate the existence and uniqueness of the mild solution for every approximate integral equation by virtue of the theory of analytic semigroup theory via the technique of Banach fixed point theorem. Next we demonstrate the convergence of the solutions of the approximate integral equations to the solution of the associated integral equation. The Faedo–Galerkin approximation of the solution is studied and demonstrated some convergence results. Finally, we give an example.

     

Invariance principles under weak dependence

The aim of this paper is to give a functional form for the central limit theorem obtained by Bradley for strong mxing sequences of random variables, under a certain assumption about the size of the maximal coefficients of correlations. The convergence of the moments of order 2 + δ in the central limit theorem for this class of random variables is also obtained.     

Convergence region inclusion theorems for continued fractionsK(a n /1)

We prove that the oval convergence theorem for continued fractionsK(a _n /1) follows from the uniform parabola theorem and from the uniform limacon theorem. Thus we are able to deduce that the ovals are uniform convergence regions and give estimates for the speed of convergence. Certain separation properties of the ovals are also established.