Two-parametric quasi-Fibonacci numbers

Smoleń, B.; Wituła, R.

Artykuł - szczegóły

Tytuł artykułu

Two-parametric quasi-Fibonacci numbers

Autorzy

Smoleń B. , Wituła R.

Treść / Zawartość

Pełne teksty:

smolen_Silesian_J_Pure_Appl_Math_2017_1.pdf

Pobierz

Identyfikatory

Warianty tytułu

Języki publikacji

Abstrakty

This paper is devoted to the discussion on the two parametric quasi–Fibonacci numbers. The fundamental recurrence and reduction formulae for arguments and indices of these quasi–Fibonacci numbers are presented here. The matrix representations of the considered numbers are described and their applications are indicated. Moreover, a number of connections of the two parametric quasi-Fibonacci numbers with the sequences collected in the OEIS encyclopaedia are noted. Despite quite large volume of this elaboration, the Authors believe that this is just some kind of announcement, or an introduction to a definitely larger and detailed discussion including, above all, the applications of the investigated here numbers.

Słowa kluczowe

Fibonacci numbers two parametric quasi-Fibonacci numbers

liczby Fibonacciego

Wydawca

Wydawnictwo Politechniki Śląskiej

Czasopismo

Silesian Journal of Pure and Applied Mathematics

Rocznik

2017

Tom

Vol. 7, iss. 1

Strony

99--121

Opis fizyczny

Bibliogr. 15 poz.

Twórcy

autor

Smoleń B.

Institute of Mathematics, Silesian University of Technology, Gliwice, Poland

autor

Wituła R.

Roman.Witula@polsl.pl

Institute of Mathematics, Silesian University of Technology, Gliwice, Poland

Bibliografia

1. Elaydi S.: An Introduction to Difference Equations. Springer-Verlag, New York 2005.
2. Everest G., van der Poorten A., Shparlinski I., Ward T.: Recurrence Sequences. American Mathematical Society, Rhode Island 2003.
3. Hetmaniok E., Piątek B., Wituła R.: Binomials transformation formulae for scaled Fibonacci numbers. Open Math. 15 (2017), 477–485.
4. Niven I.: Irrational Numbers. MAA 1956 (supplement to Russian edition written by I.M. Yaglom).
5. Prodinger H.: Representing derivatives of Chebyshev polynomials by Chebyshev polynomials and related questions. Open Math. 15 (2017), 1156–1160.
6. Rabinowitz S.: Algorithmic manipulation of third-order linear recurrences. Fib. Quart. 34 (1996), 447–464.
7. Stinchcombe A. M.: Reccurrence relations for powers of recursion sequences. Fib. Quart. 36 (1998), 443–447.
8. Wituła R.: Ramanujan type trigonometric formulae. Demonstratio Math. 45, no. 4 (2012), 779–796.
9. Wituła R.: δ-Fibonacci numbers. Part II. Novi Sad J. Math. 42 (2013), 9–22.
10. Wituła R.: Binomials transformation formulae of scaled Lucas numbers. Demonstratio Math. 46 (2013), 15–27.
11. Wituła R., Hetmaniok E., Słota D., Pleszczyński M.: δ-Fibonacci and δ- Lucas numbers, δ-Fibonacci and δ-Lucas polynomials. Math. Slovaca 67, no. 1 (2017), 51–70.
12. Wituła R., Słota D.: Quasi-Fibonacci numbers of order 11. J. Integer Seq. 10 (2007), article 07.8.5.
13. Wituła R., Słota D.: New Ramanujan-type Formulas and quasi-Fibonacci numbers of order 7. J. Integer Seq. 10 (2007), article 07.5.6.
14. Wituła R., Słota D.: δ-Fibonacci numbers. Appl. Anal. Discrete Math. 3 (2009), 310–329.
15. Wituła R., Słota D., Warzyński A.: Quasi-Fibonacci numbers of the seventh order. J. Integer Seq. 9 (2006), article 06.4.3.

Typ dokumentu

Bibliografia

Identyfikator YADDA

bwmeta1.element.baztech-8d8385f0-0c9a-4e54-b218-47a8ecd7c9e0