About the Project

体育投注平台,2022年世界杯体育投注平台,体育博彩公司,【体育博彩网址∶33kk66.com】2022年世界杯赌球网站,体育博彩网站,博彩平台推荐,网上体育投注平台,赌球平台推荐【复制打开∶33kk66.com】

AdvancedHelp

The term"kk66.com" was not found.Possible alternative term: "gcn.com".

(0.004 seconds)

1—10 of 56 matching pages

1: Wolter Groenevelt
As of September 20, 2022, Groenevelt performed a complete analysis and acted as main consultant for the update of the source citation and proof metadata for every formula in Chapter 18 Orthogonal Polynomials. …
2: Gergő Nemes
In March 2022, Nemes was named Contributing Developer of the NIST Digital Library of Mathematical Functions.
3: Richard B. Paris
 2022) was Reader in Mathematics at the University of Abertay Dundee, U. …
4: Diego Dominici
He was elected as Program Director for the period 2011–2016 and served as OPSF-Talk moderator from 2010–2022 with Bonita Saunders, and co-editor for OPSF-Net from 2006–2015 with Martin Muldoon. …
5: DLMF Project News
error generating summary
6: Bibliography T
  • N.M. Temme and E.J.M. Veling (2022) Asymptotic expansions of Kummer hypergeometric functions with three asymptotic parameters a, b and z. Indagationes Mathematicae.
  • N. M. Temme (2022) Asymptotic expansions of Kummer hypergeometric functions for large values of the parameters. Integral Transforms Spec. Funct. 33 (1), pp. 16–31.
  • C. L. Tretkoff and M. D. Tretkoff (1984) Combinatorial Group Theory, Riemann Surfaces and Differential Equations. In Contributions to Group Theory, Contemp. Math., Vol. 33, pp. 467–519.
  • 7: Errata
    Version 1.1.8 (December 15, 2022)
    Version 1.1.7 (October 15, 2022)
    Version 1.1.6 (June 30, 2022)
    Version 1.1.5 (March 15, 2022)
    Version 1.1.4 (January 15, 2022)
    8: 13.8 Asymptotic Approximations for Large Parameters
    These results follow from Temme (2022), which can also be used to obtain more terms in the expansions. For generalizations in which z is also allowed to be large see Temme and Veling (2022).
    9: 8.18 Asymptotic Expansions of I x ( a , b )
    10: 27.11 Asymptotic Formulas: Partial Sums
    Dirichlet’s divisor problem (unsolved as of 2022) is to determine the least number θ 0 such that the error term in (27.11.2) is O ( x θ ) for all θ > θ 0 . …