Abstract
The purpose of this paper is to construct generating functions for negative order Changhee numbers and polynomials. Using these generating functions with their functional equation, we prove computation formulas for combinatorial numbers and polynomials. These formulas include Euler numbers and polynomials of higher order, Stirling numbers, and negative order Changhee numbers and polynomials. We also give some properties of these numbers and polynomials with their generating functions. Moreover, we give relations among Changhee numbers and polynomials of negative order, combinatorial numbers and polynomials and Bernoulli numbers of the second kind. Finally, we give a partial derivative of an equation for generating functions for Changhee numbers and polynomials of negative order. Using these differential equations, we derive recurrence relations, differential and integral formulas for these numbers and polynomials. We also give p-adic integrals representations for negative order Changhee polynomials including Changhee numbers and Deahee numbers.
Highlights
The finite sums of powers of binomial coefficients with combinatorial numbers and polynomials have been used in almost all areas of mathematics, probability theory, statistics, physics, computer science and the other applied sciences
We investigate and study generating functions for negative order Changhee polynomials and numbers
In Sections, we investigate some properties of the negative order Changhee polynomials
Summary
The finite sums of powers of binomial coefficients with combinatorial numbers and polynomials have been used in almost all areas of mathematics, probability theory, statistics, physics, computer science and the other applied sciences. Setting x = 0 into Equation (14), we get Changhee numbers of order −k These numbers are given by the following generating function:. Some formulas and relations between these numbers and negative order Changhee polynomials and numbers are given .
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