共查询到19条相似文献,搜索用时 93 毫秒
1.
利用特异边界的Cauchy积分公式,得到了双正则函数的Laurent展式,留数定理;由Cauchy核的展开,给出了双正则函数一种新的展式,得到了展式中各项的Cauchy估计,而后定义了可去奇点,通过其充要条件得到了Liouville定理. 相似文献
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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. 相似文献
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隧洞围岩应力复变函数分析法中的解析函数求解 总被引:4,自引:3,他引:1
利用复变函数理论进行地下任意开挖断面隧洞围岩应力分析的前提,是根据围岩应力边界条件方程推导出两个解析函数.从Harnack定理出发,将隧洞围岩应力边界条件方程转化成积分方程;把Laurent级数有限项表示的映射函数引入积分方程中,将以任意开挖断面为边界条件的解析函数求解转化成以单位圆周线为边界条件的求解问题.对积分方程中各被积函数在讨论域内的解析性进行了分析,在此基础上利用留数理论求解了方程中各项积分值,并获得了用来表示任意开挖断面隧道围岩应力的两个解析函数通式.给出了圆形和椭圆形隧道的两个解析函数求解算例,所获得的结果与文献中的结果一致.利用留数理论推导出的两个解析函数通式,适用于任意开挖断面隧洞的围岩应力解析解的计算,且计算过程更为简单,计算结果更为精确. 相似文献
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通过留数定理把一个无究乘积展成Laurent级数,利用这个展式可以简单地证明表整数为八个三角数的表法数目公式。 相似文献
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利用求极限的方法可计算复变函数在无穷远点的留数;留数定理可推广到扩充复平面上无界集合的情形和围线所围区域内具有无穷多个奇点或具有非孤立奇点的情形。 相似文献
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有关复变函数的两侧注记张文文(华北电力学院)1高阶导数与留数现行教科书([1」、[2」等)都通过罗伦级数的系数给出m级极点的留数公式,这是简单且方便的。我们还可以通过高阶导数公式来证得留数公式。这样做一方面把这两者联系了起来,另一方面说明了用高阶导数... 相似文献
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本文利用油藏渗流力学原理,结合留数方法和特殊函数理论,求出了考虑井储和二次压力梯度影响的无穷均质油藏试并模型的解析解,并给出了渐近表逸式。该方法可用于求无穷双孔介质油藏、多层油藏、复合油藏等试井模型的解析解,对试井分析有理论应用价值。 相似文献
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给出并证明了曲线(实)积分可用亚纯函数的留数进行计算的充分条件,实例演示了所得结论在曲线(实)积分计算方面的应用. 相似文献
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The main aim of this article is to obtain certain Laurent type hypergeometric generating relations. Using a general double series identity, Laurent type generating functions(in terms of Kampéde Fériet double hypergeometric function) are derived. Some known results obtained by the method of Lie groups and Lie algebras, are also modified here as special cases. 相似文献
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Y.–B. Chung 《Mathematical Notes》2017,101(3-4):529-541
We construct an orthonormal basis for the class of square integrable functions on bounded domains in the plane in terms of the classical kernel functions in potential theory. Then we generalize the results of Brown and Halmos about algebraic properties of Toeplitz operators and Laurent operators on the unit disc to general bounded domains. This is a complete classification of Laurent operators and Toeplitz operators for bounded domains. 相似文献
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《Studies in Applied Mathematics》2018,140(3):333-400
Quasidefinite sesquilinear forms for Laurent polynomials in the complex plane and corresponding CMV biorthogonal Laurent polynomial families are studied. Bivariate linear functionals encompass large families of orthogonalities such as Sobolev and discrete Sobolev types. Two possible Christoffel transformations of these linear functionals are discussed. Either the linear functionals are multiplied by a Laurent polynomial, or are multiplied by the complex conjugate of a Laurent polynomial. For the Geronimus transformation, the linear functional is perturbed in two possible manners as well, by a division by a Laurent polynomial or by a complex conjugate of a Laurent polynomial, in both cases the addition of appropriate masses (linear functionals supported on the zeros of the perturbing Laurent polynomial) is considered. The connection formulas for the CMV biorthogonal Laurent polynomials, its norms, and Christoffel–Darboux kernels, in all the four cases, are given. For the Geronimus transformation, the connection formulas for the second kind functions and mixed Christoffel–Darboux kernels are also given in the two possible cases. For prepared Laurent polynomials, i.e., of the form , , these connection formulas lead to quasideterminantal (quotient of determinants) Christoffel formulas for all the four transformations, expressing an arbitrary degree perturbed biorthogonal Laurent polynomial in terms of 2n unperturbed biorthogonal Laurent polynomials, their second kind functions or Christoffel–Darboux kernels and its mixed versions. Different curves are presented as examples, such as the real line, the circle, the Cassini oval, and the cardioid. The unit circle case, given its exceptional properties, is discussed in more detail. In this case, a particularly relevant role is played by the reciprocal polynomial, and the Christoffel formulas provide now with two possible ways of expressing the same perturbed quantities in terms of the original ones, one using only the nonperturbed biorthogonal family of Laurent polynomials, and the other using the Christoffel–Darboux kernels and its mixed versions, as well. Two examples are discussed in detail. 相似文献
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In previous work, we showed that the solution of certain systems of discrete integrable equations, notably Q and T-systems, is given in terms of partition functions of positively weighted paths, thereby proving the positive Laurent phenomenon of Fomin and Zelevinsky for these cases. This method of solution is amenable to generalization to non-commutative weighted paths. Under certain circumstances, these describe solutions of discrete evolution equations in non-commutative variables: Examples are the corresponding quantum cluster algebras (Berenstein and Zelevinsky (2005) [3]), the Kontsevich evolution (Di Francesco and Kedem (2010) [10]) and the T-systems themselves (Di Francesco and Kedem (2009) [8]). In this paper, we formulate certain non-commutative integrable evolutions by considering paths with non-commutative weights, together with an evolution of the weights that reduces to cluster algebra mutations in the commutative limit. The general weights are expressed as Laurent monomials of quasi-determinants of path partition functions, allowing for a non-commutative version of the positive Laurent phenomenon. We apply this construction to the known systems, and obtain Laurent positivity results for their solutions in terms of initial data. 相似文献
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Pingrun Li 《复变函数与椭圆型方程》2016,61(1):67-75
In this paper, we investigate two classes of linear equations of discrete convolution type with harmonic singular operator. Using the Laurent transform theory, we turn the above linear equations into Riemann boundary value problems. Then, the solutions of the equations are obtained in the class of Hölder continuous functions. 相似文献
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The paper deals with the rate of convergence for the Laurent polynomials of Hermite-Fejér interpolation on the unit circle with nodal system the n roots of a complex number with modulus one. The order of convergence and the asymptotic constants are obtained when we consider analytic functions on open disks and open annulus containing the unit circle. 相似文献
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For a holomorphic family of classical pseudodifferential operators on a closed manifold we give exact formulae for all coefficients
in the Laurent expansion of its Kontsevich–Vishik canonical trace. This generalizes to all higher-order terms a known result
identifying the residue trace with a pole of the canonical trace.
Received: July 2005 Revision: December 2005 Accepted: January 2006 相似文献
18.
The generalized Hénon–Heiles system is considered. New special solutions for two nonintegrable cases are obtained using the Painlevé test. The solutions have the form of the Laurent series depending on three parameters. One parameter determines the singularity-point location, and the other two parameters determine the coefficients in the Laurent series. For certain values of these two parameters, the series becomes the Laurent series for the known exact solutions. It is established that such solutions do not exist in other nonintegrable cases. 相似文献
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We provide a general procedure for characterizing radical-like functions of skew polynomial and skew Laurent polynomial rings under grading hypotheses. In particular, we are able to completely characterize the Wedderburn and Levitzki radicals of skew polynomial and skew Laurent polynomial rings in terms of ideals in the coefficient ring. We also introduce the T-nilpotent radideals, and perform similar characterizations. 相似文献