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The American Mathematical Monthly Volume 104, 1997 - Issue 6
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Original Articles

How to do Monthly Problems With Your Computer

István NemesRISC Linz Johannes Kepler UniversityLinz, [email protected]
,
Marko PetkovšekUniversity of PennsylvaniaPhiladelphia, PA, [email protected]
,
Herbert S. WilfUniversity of LjubljanaLjubljana, [email protected]
&
Doron ZeilbergerTemple UniversityPhiladelphia, PA, [email protected]
Pages 505-519 | Published online: 10 Apr 2018

REFERENCES

  • Sister Mary Celine Fasenmyer, Some Generalized Hypergeometric Polynomials, Ph.D. dissertation, Univ. of Michigan, 1945.
  • R. W. Gosper, Jr., Indefinite hypergeometric sums in MACSYMA, Proc. MACSYMA Users Conference, Berkeley CA, 1977, 237–252.
  • R. W. Gosper, Jr., Decision procedure for indefinite hypergeometric summation, Proc. Natl. Acad. Sci. USA 75 (1978) 40–42.
  • P. Paule, Solution of a Séminaire homework example (28th SLC), RISC-Linz Report Series No. 92–59, Linz 1992.
  • P. Paule and M. Schorn, A Mathematica version of Zeilberger's algorithm for proving binomial coefficient identities, J. Symb. Comput. 20 (1995) 673–698.
  • M. Petkovšek, Hypergeometric solutions of linear recurrences with polynomial coefficients, J. Symb. Comput. 14 (1992) 243–264.
  • M. Petkovšek and H. S. Wilf, When can the sum of (1/p)th of the binomial coefficients have closed form?, Electronic J. Combinatorics, to appear.
  • M. Petkovšek, H. S. Wilf and D. Zeilberger, A = B, A K Peters, Ltd., Wellesley, MA, 1996.
  • H. S. Wilf and D. Zeilberger, Rational functions certify combinatorial identities, J. Amer. Math. Soc. 3 (1990) 147–158.
  • H. S. Wilf and D. Zeilberger, An algorithmic proof theory for hypergeometric (ordinary and “q”) multisum/integral identities, Inu. Math. 108 (1992) 575–633.
  • D. Zeilberger, The method of creative telescoping, J. Symb. Comput. 11 (1991) 195–204.

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