Scopus
YÖKSİS ISSN Eşleşti
SJR Q4
On the (s, t)-fibonacci and fibonacci matrix sequences
Ars Combinatoria · Ocak 2008
YÖKSİS Kayıtları — ISSN Eşleşmesi
On the Signless Laplacian Spectral Radius of Digraphs
2013 ISSN: 0381-7032 SCI-Expanded
Prof. Dr. ŞERİFE BURCU BOZKURT ALTINDAĞ →
On the Normalized Laplacian Eigenvalues of Graphs
2015 ISSN: 0381-7032 SCI-Expanded
Prof. Dr. ŞERİFE BURCU BOZKURT ALTINDAĞ →
On the lower bounds and upper bounds for the Euclidean norm of a complex matrix and its Applications
2013 ISSN: 0381-7032 SCI-Expanded
Prof. Dr. AYŞE DİLEK MADEN →
On the normalized Laplacian eigenvalues of graphs
2015 ISSN: 0381-7032 SCI-Expanded
Prof. Dr. AYŞE DİLEK MADEN →
Combinatorial Sums of Generalized Fibonacci and Lucas Numbers
2011 ISSN: 0381-7032 SCI-Expanded 1 atıf
Prof. Dr. KEMAL USLU →
The Generalized k Fibonacci and k Lucas Numbers
2011 ISSN: 0381-7032 SCI-Expanded 6 atıf
Prof. Dr. KEMAL USLU →
The Relations among k Fibonacci k Lucas and Generalized k Fibonacci Numbers and the Spectral Norms of the Matrices of Involving These Numbers
2011 ISSN: 0381-7032 SCI-Expanded 1 atıf
Prof. Dr. KEMAL USLU →
The (s, t) Jacobsthal and (s, t) Jacobsthal Lucas Matrix Sequences
2013 ISSN: 0381-7032 SCI-Expanded 1 atıf
Prof. Dr. KEMAL USLU →
On the Normalized Laplacian eigenvalues of graphs
2015 ISSN: 0381-7032 SCI-Expanded
Prof. Dr. AYŞE DİLEK MADEN →
New sums identities in weighted Catalan triangle with the powers of generalized Fibonacci and Lucas numbers
2014 ISSN: 0381-7032 SCI-Expanded
Prof. Dr. AYNUR YALÇINER →
Some new finite sums involving generalized Fibonacci and Lucas numbers
2016 ISSN: 0381-7032 SCI-Expanded
Prof. Dr. AYNUR YALÇINER →
Makale Bilgileri
Dergi
Ars Combinatoria
ISSN03817032
Yayın TarihiOcak 2008
Cilt / Sayfa87 · 161-173
Scopus ID2-s2.0-44449155461
Özet
It is always fascinating to see what results when seemingly different areas mathematics overlap. This article reveals one such result; number theory and linear algebra are intertwined to yield complex factorizations of the classic Fibonacci, Pell, Jacobsthal, and Mersenne numbers. Also, in this paper we define a new matrix generalization of the Fibonacci numbers, and using essentially a matrix approach we show some properties of this matrix sequence.
Yazarlar (2)
1
Haci Civciv
2
Ramazan Türkmen
Anahtar Kelimeler
Fibonacci numers
Jacobsthal numbers
Mersenne numbers
Pell numbers
Kurumlar
Selçuk Üniversitesi
Selçuklu Turkey
Scimago Dergi (ISSN Eşleşmesi)
Ars Combinatoria
Q4
SJR Skoru0,166
H-Index41
YayıncıCharles Babbage Research Centre
ÜlkeCanada
Mathematics (miscellaneous) (Q4)
Metrikler
21
Atıf
2
Yazar
4
Anahtar Kelime