Dariusz Bugajewski , Dawid Bugajewski , Xiao-Xiong Gan , Piotr Maćkowiak
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Miller formula provides a recurrence algorithm for the composition <span><math><msub><mrow><mi>B</mi></mrow><mrow><mi>a</mi></mrow></msub><mo>∘</mo><mi>f</mi></math></span>, where <span><math><msub><mrow><mi>B</mi></mrow><mrow><mi>a</mi></mrow></msub></math></span> is the formal binomial series and <em>f</em> is a formal power series, however it requires that <em>f</em> has to be a nonunit.</p><p>In this paper we provide the general J.C.P. Miller formula which eliminates the requirement of nonunitness of <em>f</em> and, instead, we establish a necessary and sufficient condition for the existence of the composition <span><math><msub><mrow><mi>B</mi></mrow><mrow><mi>a</mi></mrow></msub><mo>∘</mo><mi>f</mi></math></span>. We also provide the general J.C.P. Miller recurrence algorithm for computing the coefficients of that composition, if <span><math><msub><mrow><mi>B</mi></mrow><mrow><mi>a</mi></mrow></msub><mo>∘</mo><mi>f</mi></math></span> is well defined, obviously. 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引用次数: 0
摘要
著名的 J.C.P. Miller 公式为 Ba∘f 的组成提供了一种递推算法,其中 Ba 是形式二项式级数,f 是形式幂级数,但它要求 f 必须是非整数。在本文中,我们提供了一般的 J.C.P. Miller 公式,它消除了 f 的非整数性要求,相反,我们建立了组成 Ba∘f 存在的必要条件和充分条件。显然,如果 Ba∘f 定义良好,我们还提供了计算该组成系数的一般 J.C.P. 米勒递推算法。在本文的中心部分,我们利用一些组合技术,说明了一变量情况下一般 J.C.P. 米勒公式的显式形式。作为这些结果的应用,我们提供了多项式和形式幂级数倒数的显式公式,显然,这些倒数是存在的。我们还利用这些结果研究了无法用显式方法求解的微分方程的近似解。
On the recursive and explicit form of the general J.C.P. Miller formula with applications
The famous J.C.P. Miller formula provides a recurrence algorithm for the composition , where is the formal binomial series and f is a formal power series, however it requires that f has to be a nonunit.
In this paper we provide the general J.C.P. Miller formula which eliminates the requirement of nonunitness of f and, instead, we establish a necessary and sufficient condition for the existence of the composition . We also provide the general J.C.P. Miller recurrence algorithm for computing the coefficients of that composition, if is well defined, obviously. Our generalizations cover both the case in which f is a one–variable formal power series and the case in which f is a multivariable formal power series.
In the central part of this article we state, using some combinatorial techniques, the explicit form of the general J.C.P. Miller formula for one-variable case.
As applications of these results we provide an explicit formula for the inverses of polynomials and formal power series for which the inverses exist, obviously. We also use our results to investigation of approximate solution to a differential equation which cannot be solved in an explicit way.
期刊介绍:
Interdisciplinary in its coverage, Advances in Applied Mathematics is dedicated to the publication of original and survey articles on rigorous methods and results in applied mathematics. The journal features articles on discrete mathematics, discrete probability theory, theoretical statistics, mathematical biology and bioinformatics, applied commutative algebra and algebraic geometry, convexity theory, experimental mathematics, theoretical computer science, and other areas.
Emphasizing papers that represent a substantial mathematical advance in their field, the journal is an excellent source of current information for mathematicians, computer scientists, applied mathematicians, physicists, statisticians, and biologists. Over the past ten years, Advances in Applied Mathematics has published research papers written by many of the foremost mathematicians of our time.
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