Research Article

A Generalization of Ibn Al-Haytham Recursive Formula for Sums of Powers

Volume: 9 December 28, 2018
EN

A Generalization of Ibn Al-Haytham Recursive Formula for Sums of Powers

Abstract

In this paper, we give a generalization of Ibn al-Haytham recursive formula for sums of
powers of any integer sequence. Then, we obtain higher dimensional
generalizations of the generalized Ibn al-Haytham formula. As by-products, we also show that
how our recursive formulas imply other interesting integer sequences identities like
Karaji L-summing equation and Abel's summation by parts lemma. Finally,
as an application, we prove several identities related to Fibonnaci and harmonic numbers.

Keywords

References

  1. Abel, N. H. Untersuchungen uber die Reihe $1 + \frac{m}{1} x + \frac{m(m−1)}{1.2}x^{2} + \cdots $ , J. Reine Angew. Math., 1 (1826), 311–339.
  2. Gould, H.W. Table for Fundamentals of Series: Part I, Unpublished Manuscript Notebooks, Edited and Compiled by Jocelyn Quaintance, May 2010.
  3. Graham, R. L., Knuth, D. E., Patashnik, O. Concrete Mathematics: A Foundation for Computer Science, Addison-Wesley Publishing Company, Amsterdam, 2nd Ed., 1994. Hassani, M. Identities by L - summing method, Int. J. Math. Comput. Sci., 1(2006), 165–172.
  4. Katz, V. J., Ideas of calculus in Islam and India, Math. Magazine, 68(1995), 163–174.
  5. Masic, I. , Ibn al-Haytham-father of optics and describer of vision theory, Med Arh, Academy of Medical Sciences of Bosnia and Herzegovina, 62(2008), 183–1880.
  6. Teimoori, H. The generalized Ibn al-Haytham sums of powers formulas and combinatorial identities, In Preparation.
  7. Zeilberger, D. The method of creative telescoping, J. Symbolic Computation, 11(1991), 195–204.

Details

Primary Language

English

Subjects

-

Journal Section

Research Article

Publication Date

December 28, 2018

Submission Date

May 9, 2018

Acceptance Date

October 3, 2018

Published in Issue

Year 2018 Volume: 9

APA
Teimoori Faal, H. (2018). A Generalization of Ibn Al-Haytham Recursive Formula for Sums of Powers. Turkish Journal of Mathematics and Computer Science, 9, 25-33. https://izlik.org/JA78UJ74PY
AMA
1.Teimoori Faal H. A Generalization of Ibn Al-Haytham Recursive Formula for Sums of Powers. TJMCS. 2018;9:25-33. https://izlik.org/JA78UJ74PY
Chicago
Teimoori Faal, Hossein. 2018. “A Generalization of Ibn Al-Haytham Recursive Formula for Sums of Powers”. Turkish Journal of Mathematics and Computer Science 9 (December): 25-33. https://izlik.org/JA78UJ74PY.
EndNote
Teimoori Faal H (December 1, 2018) A Generalization of Ibn Al-Haytham Recursive Formula for Sums of Powers. Turkish Journal of Mathematics and Computer Science 9 25–33.
IEEE
[1]H. Teimoori Faal, “A Generalization of Ibn Al-Haytham Recursive Formula for Sums of Powers”, TJMCS, vol. 9, pp. 25–33, Dec. 2018, [Online]. Available: https://izlik.org/JA78UJ74PY
ISNAD
Teimoori Faal, Hossein. “A Generalization of Ibn Al-Haytham Recursive Formula for Sums of Powers”. Turkish Journal of Mathematics and Computer Science 9 (December 1, 2018): 25-33. https://izlik.org/JA78UJ74PY.
JAMA
1.Teimoori Faal H. A Generalization of Ibn Al-Haytham Recursive Formula for Sums of Powers. TJMCS. 2018;9:25–33.
MLA
Teimoori Faal, Hossein. “A Generalization of Ibn Al-Haytham Recursive Formula for Sums of Powers”. Turkish Journal of Mathematics and Computer Science, vol. 9, Dec. 2018, pp. 25-33, https://izlik.org/JA78UJ74PY.
Vancouver
1.Hossein Teimoori Faal. A Generalization of Ibn Al-Haytham Recursive Formula for Sums of Powers. TJMCS [Internet]. 2018 Dec. 1;9:25-33. Available from: https://izlik.org/JA78UJ74PY