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怎样求函数EXP~((q))的可接受有理逼近 总被引:2,自引:0,他引:2
杨逢建 《湘潭师范学院学报(社会科学版)》1990,(3)
本文首先得到了函数R_(?)~s(q)是函数exp(q)的各类可接受有理逼近的必要条件,其次证明了exp(q)的含有s+t-p~*个自由参数的不低于p~*阶的有理逼近存在,且对于参数的每一组给定值,逼近式唯一.接着就逼近阶P≧2s-2,s≧2情形给出了exp(q)的双参数有理逼近R_s~s(q_ib_(s-1),b_s)和三参数有理逼近R_(s+1)~s(q_ib_(s-1),b_s,b_(s+1))的系数计算公式,并由此得到了求exp的含有多个自由参数的有理逼近的一般方法. 相似文献
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GUChuan-qing 《上海大学学报(英文版)》2001,5(1):11-14
A recursive rational algorithm for matrix exponentials was botained by making use of the generalized inverse of a matrix in this paper.On the basis of the n-th convergence of thiele-type continued fraction expansion,a new type of the generalized inverse matrix-valued pade approximant(GMPA)for matrix exponentials was defined and its remainder formula was proved.The resuts of this paper were illustrated by some examples. 相似文献
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1 Introduction Letf(x ,λ)beagivenpowerserieswithfunction valuedcoefficients,f(x ,λ) =c0 (x) c1(x)λ c2 (x)λ2 … cn(x)λn … (1)wherecj(x)isarealorcomplexfunctionwithre specttox∈ (a ,b) .Suppoethatf(x ,λ)isanalyticasafunctionofλattheoriginλ =0 . Chisholm[1] pointedoutPad啨approximantmethodcanbeusedforobtainingthesolutionofawkwardin tegralequations,andespeciallythosewhichpossessageneratingfunctionoftheform (1) ,sinceth… 相似文献
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An interval Pade-type approximation is introduced and then Routh-Pade-type method (IRPTM) is presented to model reduction in interval systems. The denominator in reduced model is obtained from the stable Routh table, and its numerator is constructed by the interval Pade-type definition. Compared to the existing Routh-Pade method, IRPTM does not need to solve linear interval equations theoretical analysis shows that IRPTM has example is given to illustrate our method. Hence, we do not have to compute smaller computational cost than that interval division in the process. Moreover, of Routh-Pade method. A typical numerical 相似文献
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利用MATLAB进行Pade逼近的计算机辅助教学,通过对Pade方程的MATLAB运算和对函数Pade逼近式的图形比较,探讨用MATLAB进行Pade逼近辅助教学的可行性和方便性。 相似文献
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The generalized inverse function-valued Pade approximant was defined to solve the integral equations. However, it is difficult to compute the approximants by some high-order determinant formulas. In this paper, to simplify computation of the function-valued Pade approximants, an efficient Pfaffian formula for the determinants was extended from the matrix form to the function-valued form. As an important application, a Pfaffian formula of [4/4] type Pade approximant was established. 相似文献
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