1. The (p,q)-sine and (p,q)-cosine polynomials and their associated (p,q)-polynomials.
- Author
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Husain, Saddam, Khan, Nabiullah, Usman, Talha, and Choi, Junesang
- Subjects
- *
POLYNOMIALS , *LIE algebras , *RESEARCH personnel , *INTEGRAL representations , *COSINE function , *EULER polynomials - Abstract
The introduction of two-parameter (p , q) -calculus and Lie algebras in 1991 has spurred a wave of recent research into (p , q) -special polynomials, including (p , q) -Bernoulli, (p , q) -Euler, (p , q) -Genocchi and (p , q) -Frobenius–Euler polynomials. These investigations have been carried out by numerous researchers in order to uncover a wide range of identities associated with these polynomials and applications. In this article, we aim to introduce (p , q) -sine and (p , q) -cosine based λ-array type polynomials and derive numerous properties of these polynomials such as (p , q) -integral representations, (p , q) -partial derivative formulae and (p , q) -addition formulae. It is worth noting that the utilization of the (p , q) -polynomials introduced in this study, along with other (p , q) -polynomials, can lead to the derivation of various identities that differ from the ones presented here. [ABSTRACT FROM AUTHOR]
- Published
- 2024
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