共查询到19条相似文献,搜索用时 62 毫秒
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主要研究勒让德多项式与契贝谢夫多项式之间的关系的性质,利用生成函数和函数级数展开的方法,得出了勒让德多项式与契贝谢夫多项式之间的一个重要关系,这对勒让德多项式与契贝谢夫多项式的研究有一定的推动作用. 相似文献
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本文证明了勒让德多项式 Pn( x)的 k阶导数 P( k)n ( x)是 [-1 ,1 ]上关于权函数 ρ( x) =( 1 -x2 ) k的正交多项式 ,推广了 [1 ]的结果 . 相似文献
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关于勒让德多项式导数的正交性 总被引:2,自引:0,他引:2
本证明了勒让德多项式Pn(x)的k阶导数P^(k)n(x)是「-1,1」上关于权函数ρ(x)=(1-x^2)^k的正交多项式,推广了「1」的结果。 相似文献
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使用勒让德正交多项式逼近方法,将Lagrange型最优控制问题转化为非线性规划问题.采用序列二次规划方法对此非线性规划问题的求解,并对多项式逼近和非线性规划求解后得到的解是否收敛给出了证明和实例分析. 相似文献
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针对m阶非线性Volterra-Fredholm型积分微分方程,利用勒让德-伽辽金方法进行求解.勒让德多项式被选作基函数,通过基函数与残差正交得到有限维方程组,求解有限维方程组得到待定系数,便能求出方程的近似解.一些数值算例的给出证明了方法的可行性和有效性. 相似文献
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《数学的实践与认识》2015,(11)
设P_n(x)表示勒让德多项式.即就是P_0(x)=1,P_1(x)=x,当n≥2时有递推关系,P_(n+1)(x)=(2n+1)/(n+1)·xP_n(x)-n/(n+1)·P_(n-1)(x).主要目的是运用初等方法以及幂级数的性质讨论一类包含P_(n)(x)的卷积的定积分计算问题,并给出一些确切的计算公式. 相似文献
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首先介绍方阵A的零化多项式,进而介绍方阵A的最小多项式,给出最小多项式的一些性质,最后主要讨论最小多项式的三种求法。 相似文献
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利用广义Lucas多项式L n(x,y)的性质,通过构造组合和式T n(x,y;tx2),结合Bernoulli多项式的生成函数和Euler多项式的生成函数,采用分析学中的方法,得到两个有关L2n(x,y)的恒等式.并从这一结果出发,得到了两个推论,推广了相关文献的一些结果. 相似文献
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Yucheng Liu 《Mathematical and Computer Modelling》2009,49(5-6):1268-1273
This paper illustrates the using of orthogonal polynomials to modify the Adomian decomposition method. The method of employing Legendre polynomials to improve the Adomian decomposition method is presented here and compared to the method of using Chebyshev polynomials. The presented modified Adomian decomposition method is validated through an example and advantage as well as efficiency of this method is verified through investigating and comparing the results. In this paper, it is concluded that both orthogonal polynomials: Chebyshev and Legendre polynomials can be successfully used for the Adomian decomposition method and comparatively the Chebyshev expansion provides the better estimation. 相似文献
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讨论了 Fibonacci数与 Legendre多项式之间的关系 ,得到了一些有趣的恒等式 . 相似文献
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Ever since Legendre introduced the polynomials that bear his name in 1785, they have played an important role in analysis, physics and number theory, yet their algebraic properties are not well-understood. Stieltjes conjectured in 1890 how they factor over the rational numbers. In this paper, assuming Stieltjes’ conjecture, we formulate a conjecture about the Galois groups of Legendre polynomials, to the effect that they are “as large as possible,” and give theoretical and computational evidence for it. 相似文献
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I. N. Pak 《Mathematical Notes》1971,10(4):655-661
The sums of series of Legendre polynomials can be reduced to quadratures and on this basis the properties of these sums are investigated.Translated from Matematicheskie Zametki, Vol. 10, No. 4, pp. 387–398, October, 1971. 相似文献
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The quadratic performance measure of estimation errors in approximated by using the Legendre polynomial approach for the design of optimal observers with specified distinct and multiple eigenvalues. This method is simple as compared with other design techniques of optimal observers. One example is illustrated, and only a small number (m=6) of shifted Legendre series are needed to produce a much better result than that obtained by the convenient block-pulse function. 相似文献
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P. A. Vshivtseva V. I. Denisov I. P. Denisova 《Theoretical and Mathematical Physics》2011,166(2):186-193
We prove two lemmas and one theorem that allow integrating the product of an arbitrary number of unit vectors and the Legendre
polynomials over a sphere of arbitrary radius. Such integral tensor products appear in solving inhomogeneous Helmholtz equations
whose right-hand side is proportional to the product of a nonfixed number of unit vectors. 相似文献
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In this paper, an efficient modification of the Adomian decomposition method by using Legendre polynomials is presented. Both linear and non-linear models are suited for the proposed method. Some examples here in are solved by using this method and this paper will demonstrate that the results are more reliable and efficient. 相似文献
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1. Introduction and Main ResultsDenote by Pn the set of algebraic polynomials of degree not exceeding n. LetX = {X = (xl,xz,...,x.). 1 = xl > xz >' > xtL--l > xtL = --l}, n 2 2and let for X E X.Erd6s in [21 raised the question of determining Y E X such thatReceived July 21, 1999.also conjectured that Y = Z satisfyingw,,(Z, x) = c1' l" Pt.--1 (x) dx,j-- 1 Pt.-- 1 (x) dx,1 .2>where P,--1 stands for the (n -- 1)th Legendre polynomial normalized by Pn--1 (1) = l. Thiscolljecture was di… 相似文献
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Abdlilah Bouali 《Bulletin des Sciences Mathématiques》2009,133(7):733
We define a new class of Humbert's polynomials which generalizes the well-known class of Gegenbauer, Legendre, Pincherle, Horadam-Mahon, Kinney, Hordam-Pethe, Gould and Pathan-Khan polynomials. We prove that these generalized polynomials are eigenfunctions of the Hamiltonian of the Calogero-Sutherland model. We show several differential equations having these polynomials for solutions. 相似文献