共查询到18条相似文献,搜索用时 109 毫秒
1.
广义Bernoulli数和广义高阶Bernoulli数 总被引:17,自引:1,他引:16
雒秋明 《纯粹数学与应用数学》2002,18(4):305-308
定义了广义Bernoulli数和广义高阶Bernoulli数,建立了它们的递推公式和有关性质,从而推广了Bernoulli数和高阶Bernoulli数。 相似文献
2.
讨论了高阶Genocchi数的性质,建立了一些包含高阶Genocchi数和高阶Euler-Bernoulli数的恒等式. 相似文献
3.
高阶多元Euler多项式和高阶多元Bernoulli多项式 总被引:1,自引:1,他引:0
本文给出了高阶多元Euler数和多项式与高阶多元Bernouli数和多项式的定义,讨论了它们的一些重要性质,得到了高阶多元Euler多项式(数)和高阶多元Bernouli多项式(数)的关系式· 相似文献
4.
利用第一、二类高阶Bernoulli数和二类Stirling数S1(n,k),S2(n,k)的定义.研究了二类高阶Bernoulli数母函数的幂级数展开,揭示了二类高阶Bernoulli数之间以及与第一类Stirling数S1(n,k)、第二类Stirling数S2(n,k)之间的内在联系,得到了几个关于二类高阶Bernoulli数和第一类Stirling数S1(n,k)、第二类Stirling数S2(n,k)之间有趣的恒等式. 相似文献
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给出了高阶Bernoulli数的一个递推公式和Nrlund数的一个计算公式,推广了Namias[4],Deeba和Rodriguez[5],Tuenter[6]的结果. 相似文献
7.
本文讨论了广义中心阶乘数的性质,刻画了广义中心阶乘数与高阶Euler-Bernoulli数和多项式的关系,建立了一些包含 Norlund Euler-Bernoulli多项式恒等式,推广了 Dilcher K.[1],Zhang Wenpeng[2]和 Zeitlin David[3]的结果. 相似文献
8.
利用广义高阶Bernoulli数的性质及Dirichlet L-函数的均值定理,研究了Gauss和及广义Kloosterman和与广义高阶Bernoulli数的均值性质,并给出两个有趣的渐近公式. 相似文献
9.
广义中心阶乘数与高阶Nrlund Euler-Bernoulli多项式 总被引:15,自引:0,他引:15
本文讨论了广义中心阶乘数的性质,刻画了广义中心阶乘数与高阶Euler-Bernoulli数和多项式的关系,建立了一些包含 Norlund Euler-Bernoulli多项式恒等式,推广了 Dilcher K.[1],Zhang Wenpeng[2]和 Zeitlin David[3]的结果. 相似文献
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Paul Thomas Young 《Journal of Number Theory》2008,128(4):738-758
We prove a general symmetric identity involving the degenerate Bernoulli polynomials and sums of generalized falling factorials, which unifies several known identities for Bernoulli and degenerate Bernoulli numbers and polynomials. We use this identity to describe some combinatorial relations between these polynomials and generalized factorial sums. As further applications we derive several identities, recurrences, and congruences involving the Bernoulli numbers, degenerate Bernoulli numbers, generalized factorial sums, Stirling numbers of the first kind, Bernoulli numbers of higher order, and Bernoulli numbers of the second kind. 相似文献
12.
Mehmet Cenkci 《Discrete Mathematics》2009,309(6):1498-1510
We define the generalized potential polynomials associated to an independent variable, and prove an explicit formula involving the generalized potential polynomials and the exponential Bell polynomials. We use this formula to describe closed type formulas for the higher order Bernoulli, Eulerian, Euler, Genocchi, Apostol-Bernoulli, Apostol-Euler polynomials and the polynomials involving the Stirling numbers of the second kind. As further applications, we derive several known identities involving the Bernoulli numbers and polynomials and Euler polynomials, and new relations for the higher order tangent numbers, the higher order Bernoulli numbers of the second kind, the numbers , the higher order Bernoulli numbers and polynomials and the higher order Euler polynomials and their coefficients. 相似文献
13.
对一类有界独立或相依的随机变量序列|ξn|,获得了它的伯努利大数定律、波雷尔强大数定律及常返性定理.作为应用,得出了Loève专著[1]中的推广的伯努利大数定律、常返性定理,改进了[1]中的推广的波雷尔强大数定律. 相似文献
14.
Weiping Wang 《Journal of Mathematical Analysis and Applications》2010,364(1):255-761
From a delta series f(t) and its compositional inverse g(t), Hsu defined the generalized Stirling number pair . In this paper, we further define from f(t) and g(t) the generalized higher order Bernoulli number pair . Making use of the Bell polynomials, the potential polynomials as well as the Lagrange inversion formula, we give some explicit expressions and recurrences of the generalized higher order Bernoulli numbers, present the relations between the generalized higher order Bernoulli numbers of both kinds and the corresponding generalized Stirling numbers of both kinds, and study the relations between any two generalized higher order Bernoulli numbers. Moreover, we apply the general results to some special number pairs and obtain series of combinatorial identities. It can be found that the introduction of generalized Bernoulli number pair and generalized Stirling number pair provides a unified approach to lots of sequences in mathematics, and as a consequence, many known results are special cases of ours. 相似文献
15.
Sheng-liang Yang 《Discrete Mathematics》2008,308(4):550-554
The main purpose of this paper is to prove an identity of symmetry for the higher order Bernoulli polynomials. It turns out that the recurrence relation and multiplication theorem for the Bernoulli polynomials which discussed in [F.T. Howard, Application of a recurrence for the Bernoulli numbers, J. Number Theory 52 (1995) 157-172], as well as a relation of symmetry between the power sum polynomials and the Bernoulli numbers developed in [H.J.H. Tuenter, A symmetry of power sum polynomials and Bernoulli numbers, Amer. Math. Monthly 108 (2001) 258-261], are all special cases of our results. 相似文献
16.
Takashi Agoh 《Discrete Mathematics》2009,309(4):887-274
Starting with two little-known results of Saalschütz, we derive a number of general recurrence relations for Bernoulli numbers. These relations involve an arbitrarily small number of terms and have Stirling numbers of both kinds as coefficients. As special cases we obtain explicit formulas for Bernoulli numbers, as well as several known identities. 相似文献
17.
We prove convolution identities of arbitrary orders for Bernoulli and Euler polynomials, i.e., sums of products of a fixed but arbitrary number of these polynomials. They differ from the more usual convolutions found in the literature by not having multinomial coefficients as factors. This generalizes a special type of convolution identity for Bernoulli numbers which was first discovered by Yu. Matiyasevich. 相似文献
18.
广义n阶Euler-Bernoulli多项式 总被引:25,自引:2,他引:23
刘国栋 《数学的实践与认识》1999,29(3):5-10
本文得到了广义n阶Euler数和广义n阶Bernoulli数,广义n阶Euler多项式和广义n阶Bernoulli多项式的关系式。 相似文献