[KSCI] Korea Science Citation Index Service

http://dx.doi.org/10.11568/kjm.2022.30.3.433

q-COEFFICIENT TABLE OF NEGATIVE EXPONENT POLYNOMIAL WITH q-COMMUTING VARIABLES

Choi, Eunmi (Department of Mathematics, Hannam University)

Publication Information

Korean Journal of Mathematics / v.30, no.3, 2022 , pp. 433-442 More about this Journal

Abstract

Let N^(q) be an arithmetic table of a negative exponent polynomial with q-commuting variables. We study sequential properties of diagonal sums of N^(q). We first device a q-coefficient table $\hat{N}$ of N^(q), find sequences of diagonal sums over $\hat{N}$ , and then retrieve the findings of $\hat{N}$ to N^(q). We also explore recurrence rules of s-slope diagonal sums of N^(q) with various s and q.

Keywords

q-commuting variable; negative arithmetic table; generalized Fibonacci sequence.;

Citations & Related Records

Reference

1	E. Choi, J. Jo, Sequential properties over negative Pauli Pascal table, Int. J. Mathematics and Mathematical Sciences, Article ID 3805462, (2020).
2	E. Choi, J. Jo, General slope diagonal sums of noncommuting q-table, J. of Algebra and Applied Mathematics, 19 (2021), 75-96.
3	M.E. Horn, Pascal Pyramids, Pascal Hyper-Pyramids and a Bilateral Multinomial Theorem, arXiv:math/0311035v1 (math.GM), 4 (2003).
4	M.E. Horn, Pauli Pascal pyramids, Pauli Fibonacci numbers, and Pauli Jacobsthal numbers, arXiv:0711.4030 [math.GM]
5	A. Stakhov, B. Rozin, Theory of Binet formulas for Fibonacci and Lucas p-numbers, Chaos, Solitons and Fractals, 27 (2006), 1162-1177. DOI
6	E. Kilic, The Binet formula, sums and representations of generalized Fibonacci p-numbers, European J. Combinatorics (2008), 701-711.