一类有理分式积分的解法

将求有理分式积分的传统待定常数法推广到待定函数法,给出有理分式积分中求部分分式的公式解法,此法可解决一类有理函数的积分问题．     

用Laurent级数展开法化有理分式为部分分式

将函数Laurent展开定理及留数概念应用于有理分式得到将有理分式化为部分分式的一种行之有效的方法.     

齐次有理分式函数f(x,y)的极限存在判别法

本刊1981年第10期吴檀同志发表的一文“齐次有理分式函数f(x,y)的极限问题”中,给了齐次有理分式函数f(x,y)的极限存在判别法。为了开拓思路,扩大眼界,本文仅就上述的判别法给出一个新的证明。 设齐次有理分式函数f(x,y)=g(x,y)/h(x,y),其中g(x,y),h(x,y)分别是关于x,y的实系数的m次和n次     

一般频率依存数字最优预见伺服系统

本文研究了一般类型的频率依存数字最优预见伺服系统，给出了这类系统的设计方法．按照所给的方法，无论目标值信号与输出信号间的误差向量前附加一个什么样的有理分式形频率依存荷重，都可以针对它设计最优预见伺服系统．本文还通过数值仿真，把所得结论应用于直线电机，证明了方法的有效性．     

二重极限不存在的一种证明方法

给出一类常见的二元有理分式函数极限不存在的一种证明方法,并举例说明.     

一个有理分式不等式的加细

利用控制不等式理论给出了一个有理分式不等式的两种加细,并比较了二者的优劣.     

关于一道不定积分题的注记

有理分式的积分,常常可用有理函数分解成最简分式的方法求解,且不致出现错误.     

广义齐次有理分式函数极限的存在判别法

本文给出一个二元广义齐次有理分式函数极限的存在性判别准则.     

一类多元函数极限不存在性判别法

为一类二元及三元广义齐次有理分式函数极限的不存在性建立一个判别准则.     

有理分式的增广图示及其在工程控制论中的应用

本文研究有理分式的增广图示,分子分母分别为n及m次多项式的有理分式,它的根轨迹方程的次数,当n+m是偶数时,是y2的(n+m)/2-1次;当n+m是奇数时,是(n+m-1)/2次.因此,n+m≤10的图示数据能用公式计算有理分式的增广图示能应用于研究反馈系统及特征方程的任一实系数作参数的图线特性.用本文理论易证倒分式定理:K₁=f(n)(s)/(F)(m)(s),与K₂=F(m)(s)/f(n)(s)二者在复数平面上的根轨迹完全相同又由图示知识发现,不论n和m多大,只要有理分式的零点和极点在实轴上相间排列,它就没有复数根轨迹,这样的系统不会发生振荡,本文对这种分式可能存在的稳定区作较全面地分析.     

The Chowla-Selberg formula

The Chowla-Selberg formula is a monomial relation connecting the values of certain automorphic form at special points to the values of Γ functions at rational points. A generalization of this formula is established in the context of CM-fields: the values of a distinguished Hilbert automorphic form at special points are expressed in terms of multiple Γ functions.     

Residue formulae, vector partition functions and lattice points in rational polytopes

We obtain residue formulae for certain functions of several variables. As an application, we obtain closed formulae for vector partition functions and for their continuous analogs. They imply an Euler-MacLaurin summation formula for vector partition functions, and for rational convex polytopes as well: we express the sum of values of a polynomial function at all lattice points of a rational convex polytope in terms of the variation of the integral of the function over the deformed polytope.

     

The Mean-value of Meromorphic Functions with Respect to a Generalized Boolean Transformation

A formula for the mean-value distribution of certain meromorphic functions on a vertical line s = σ +iR under a generalized Boolean transformation, called rational Boolean transformation from R into itself, is derived using Birkhoff 's ergodic theorem. This formula is represented as a computable integral. Using the Cauchy's integral theorem, values of this integral corresponding to various possible cases are explicitly computed.     

Quadrature formulas for Bessel polynomials

A quadrature formula is a formula computing a definite integration by evaluation at finite points. The existence of certain quadrature formulas for orthogonal polynomials is related to interesting problems such as Waring’s problem in number theory and spherical designs in algebraic combinatorics. Sawa and Uchida proved the existence and the non-existence of certain rational quadrature formulas for the weight functions of certain classical orthogonal polynomials. Classical orthogonal polynomials belong to the Askey-scheme, which is a hierarchy of hypergeometric orthogonal polynomials. Thus, it is natural to extend the work of Sawa and Uchida to other polynomials in the Askey-scheme. In this article, we extend the work of Sawa and Uchida to the weight function of the Bessel polynomials. In the proofs, we use the Riesz–Shohat theorem and Newton polygons. It is also of number theoretic interest that proofs of some results are reduced to determining the sets of rational points on elliptic curves.     

On an Analog of the Plan’s Formula

In this paper we obtain an analog of the Plan’s formula, which plays an essential role in obtaining a functional relation for classical Riemann zeta-function.We provide examples of rational functions that satisfy a certain symmetry condition and admit a Maclaurin series expansion with coefficients equal to zero or one.     

Hyperfunctions, formal groups and generalized Lipschitz summation formulas

A construction relating the theory of hyperfunctions with the theory of formal groups and generalizations of the classical Lipschitz summation formula is proposed. It involves new polylogarithmic rational functions constructed via the Fourier expansion of certain sequences of Bernoulli-type polynomials, related to the Lazard formal group. Related families of one-dimensional hyperfunctions are also constructed.     

Modified quadrature formulas for functions with nearby poles

This paper is concerned with the numerical integration of functions with poles near the interval of integration. A method is given for modifying known quadrature rules, to obtain rules which are exact for certain classes of rational functions.     

On computing rational Gauss-Chebyshev quadrature formulas

We provide an algorithm to compute the nodes and weights for Gauss-Chebyshev quadrature formulas integrating exactly in spaces of rational functions with arbitrary real poles outside . Contrary to existing rational quadrature formulas, the computational effort is very low, even for extremely high degrees, and under certain conditions on the poles it can be shown that the complexity is of order . This method is based on the derivation of explicit expressions for Chebyshev orthogonal rational functions, which are (thus far) the only examples of explicitly known orthogonal rational functions on with arbitrary real poles outside this interval.