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文章基本信息

  • 标题:A partial factorization of the powersum formula
  • 本地全文:下载
  • 作者:John Michael Nahay
  • 期刊名称:International Journal of Mathematics and Mathematical Sciences
  • 印刷版ISSN:0161-1712
  • 电子版ISSN:1687-0425
  • 出版年度:2004
  • 卷号:2004
  • 期号:58
  • 页码:3075-3101
  • DOI:10.1155/S0161171204401215
  • 出版社:Hindawi Publishing Corporation
  • 摘要:

    For any univariate polynomial P whose coefficients lie in an ordinary differential field 𝔽 of characteristic zero, and for any constant indeterminate α , there exists a nonunique nonzero linear ordinary differential operator ℜ of finite order such that the α th power of each root of P is a solution of ℜ z α = 0 , and the coefficient functions of ℜ all lie in the differential ring generated by the coefficients of P and the integers ℤ . We call ℜ an α -resolvent of P . The author's powersum formula yields one particular α -resolvent. However, this formula yields extremely large polynomials in the coefficients of P and their derivatives. We will use the A -hypergeometric linear partial differential equations of Mayr and Gelfand to find a particular factor of some terms of this α -resolvent. We will then demonstrate this factorization on an α -resolvent for quadratic and cubic polynomials.

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