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Nobuki Takayama: [Publications] [Author Rank by year] [Co-authors] [Prefers] [Cites] [Cited by]

Publications of Author

  1. Nobuki Takayama
    Generating Kummer Type Formulas for Hypergeometric Functions. [Citation Graph (0, 0)][DBLP]
    Algebra, Geometry, and Software Systems, 2003, pp:131-145 [Conf]
  2. Masayuki Noro, Nobuki Takayama
    Links to Projects. Mathematical Software, icms2006 - Developer's Meeting. [Citation Graph (0, 0)][DBLP]
    ICMS, 2006, pp:438-450 [Conf]
  3. Nobuki Takayama
    Gröbner Basis, Integration and Transcendental Functions. [Citation Graph (0, 0)][DBLP]
    ISSAC, 1990, pp:152-156 [Conf]
  4. Nobuki Takayama
    An Algorithm of Constructing the Integral of a Module - an Infinite Dimensional Analog of Gröbner Basis. [Citation Graph (0, 0)][DBLP]
    ISSAC, 1990, pp:206-211 [Conf]
  5. Arjeh M. Cohen, Xiao-Shan Gao, Nobuki Takayama
    Editorial. [Citation Graph (0, 0)][DBLP]
    J. Symb. Comput., 2004, v:38, n:4, pp:1167-1168 [Journal]
  6. Michel Granger, Toshinori Oaku, Nobuki Takayama
    Tangent cone algorithm for homogenized differential operators. [Citation Graph (0, 0)][DBLP]
    J. Symb. Comput., 2005, v:39, n:3-4, pp:417-431 [Journal]
  7. Toshinori Oaku, Nobuki Takayama
    Minimal Free Resolutions of Homogenized D-modules. [Citation Graph (0, 0)][DBLP]
    J. Symb. Comput., 2001, v:32, n:6, pp:575-595 [Journal]
  8. Toshinori Oaku, Nobuki Takayama, Uli Walther
    A Localization Algorithm for D-modules. [Citation Graph (0, 0)][DBLP]
    J. Symb. Comput., 2000, v:29, n:4-5, pp:721-728 [Journal]
  9. Nobuki Takayama
    An Approach to the Zero Recognition Problem by Buchberger Algorithm. [Citation Graph (0, 0)][DBLP]
    J. Symb. Comput., 1992, v:14, n:2/3, pp:265-282 [Journal]
  10. Nobuki Takayama
    An Algorithm for Finding Recurrence Ralations of Binomial Sums and its Complexity. [Citation Graph (0, 0)][DBLP]
    J. Symb. Comput., 1995, v:20, n:5/6, pp:637-651 [Journal]

  11. Solutions of polynomial systems derived from the steady cavity flow problem. [Citation Graph (, )][DBLP]


  12. Holonomic Gradient Descent and its Application to Fisher-Bingham Integral [Citation Graph (, )][DBLP]


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