Author:
Erdağ Özgür,Halıcı Serpıl,Deveci Ömür
Abstract
In this paper, we define the complex-type Padovan-p sequence and then give the relationships between the Padovan-p numbers and the complex-type Padovan-p numbers. Also, we provide a new Binet formula and a new combinatorial representation of the complex-type Padovan-p numbers by the aid of the nth power of the generating matrix of the complex-type Padovan-p sequence. In addition, we derive various properties of the complex-type Padovan-p numbers such as the permanental, determinantal and exponential representations and the finite sums by matrix methods.
Publisher
Centre for Evaluation in Education and Science (CEON/CEES)
Reference22 articles.
1. G. Berzsenyi, Sums of products of generalized Fibonacci numbers, The Fibonacci Quarterly, 13 (4) (1975), 343-344.;
2. R. A. Brualdi, P. M. Gibson, Convex polyhedra of doubly stochastic matrices I. Applications of permanent function, The Journal of Combinatorial Theory, Series A, 22 (2) (1977), 194-230.;
3. W. Y. C. Chen, J. D. Louck, The combinatorial power of the companion matrix, Linear Algebra and its Applications, 232 (1996), 261-278.;
4. O. Deveci, E. Karaduman, On the Padovan p-numbers, Hacettepe Journal of Mathematics and Statistics, 46 (4) (2017), 579-592.;
5. O. Deveci, A. G. Shannon, The complex-type k-Fibonacci sequences and their applications, Communications in Algebra, 49 (3) (2021), 1352-1367.;
Cited by
2 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献