Certain Identities Associated with (p,q)-Binomial Coefficients and (p,q)-Stirling Polynomials of the Second Kind

Abstract: The q-Stirling numbers (polynomials) of the second kind have been investigated and applied in a variety of research subjects including, even, the q-analogue of Bernstein polynomials. The (p,q)-Stirling numbers (polynomials) of the second kind have been studied, particularly, in relation to combinatorics. In this paper, we aim to introduce new (p,q)-Stirling polynomials of the second kind which are shown to be fit for the (p,q)-analogue of Bernstein polynomials. We also present some interesting identities invol… Show more

“…Proof. We transform the problem ( 7) and ( 8) into a fixed-point problem F x = x, where the operator F is given by (24). Applying Banach's contraction mapping principle, we will show that F has a unique fixed point.…”

“…The subject of (p, q)-calculus is known as the extension of q-calculus to its twoparameter (p, q) variant and has efficient applications in many fields. One can find some useful information about the (p, q)-calculus in [22][23][24][25][26][27][28][29][30].…”

Existence and Uniqueness Results for Fractional (p, q)-Difference Equations with Separated Boundary Conditions

“…Proof. We transform the problem ( 7) and ( 8) into a fixed-point problem F x = x, where the operator F is given by (24). Applying Banach's contraction mapping principle, we will show that F has a unique fixed point.…”

“…The subject of (p, q)-calculus is known as the extension of q-calculus to its twoparameter (p, q) variant and has efficient applications in many fields. One can find some useful information about the (p, q)-calculus in [22][23][24][25][26][27][28][29][30].…”

Existence and Uniqueness Results for Fractional (p, q)-Difference Equations with Separated Boundary Conditions

“…Numerous polynomials, numbers, their extensions, degenerations, and new polynomials and new numbers have been developed and studied, owing primarily to their potential applications and use in a diverse variety of research fields (see, e.g., [66][67][68][69][70][71] and the references therein). For example, Bernoulli polynomials and numbers are among most important and useful ones (see, e.g., [5], pp.…”

Reduction Formulas for Generalized Hypergeometric Series Associated with New Sequences and Applications

“…Latif et al [22] proved the new variations in trapezoidal inequalities after quantum have been shown to be achieved using the new (p, q)-integral identity. Based on (p, q)-calculus, many works have been published by many researchers, see in [23][24][25][26][27][28][29][30] for more details and the references cited therein.…”

Trapezoidal-Type Inequalities for Strongly Convex and Quasi-Convex Functions via Post-Quantum Calculus