Some identities on the higher-order-twisted q-Euler numbers and polynomials with weight α

Lee, Hui Young; Jung, Nam Soon; Kang, Jung Yoog; Ryoo, Cheon Seoung

doi:10.1186/1687-1847-2012-21

Research
Open Access
Published: 29 February 2012

Some identities on the higher-order-twisted q-Euler numbers and polynomials with weight α

Hui Young Lee¹,
Nam Soon Jung¹,
Jung Yoog Kang¹ &
…
Cheon Seoung Ryoo¹

Advances in Difference Equations volume 2012, Article number: 21 (2012) Cite this article

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Abstract

In this article, we introduce some properties of higher-order-twisted q-Euler numbers and polynomials with weight α, and we observe some properties of higher-order-twisted q-Euler numbers and polynomials with weight α for several cases. In particular, by using the the fermionic p-adic q-integral on ℤ_p, we give a new concept of twisted q-Euler numbers and polynomials with weight α.

2000 Mathematics Subject Classification: 11B68; 11S40; 11S80.

1. Introduction

Let p be a fixed odd prime. Throughout this article ℤ_p, $ℚ_{p}$ , ℂ, and ℂ_p, will, respectively, denote the ring of p- adic rational integers, the field of p-adic rational numbers, the complex number field, and the completion of algebraic closure of $ℚ_{p}$ . Let ℕ be the set of natural numbers and ℤ₊ = ℕ∪{0}. Let ν_pbe the normalized exponential valuation of ℂ_pwith ${|p|}_{p} = p^{- ν_{p} (p)} = p^{- 1}$ (see [1–14]). When one speaks of q-extension, q can be regarded as an indeterminate, a complex number q ∈ ℂ, or p-adic number q ∈ ℂ_p; it is always clear from context. If q ∈ ℂ, we assume |q| < 1. If q ∈ ℂ_p, then we assume |1 - q|_p< 1 (see [1–14]).

In this article, we use the notation of q-number as follows (see [1–14]):

{[x]}_{q} = \frac{1 - q^{x}}{1 - q} .

Note that lim_q→1[x]_q= x for any x with |x|_p≤ 1 in the p-adic case.

Let C(ℤ_p) be the space of continuous functions on ℤ_p. For f ∈ C(ℤ_p), Kim defined the fermionic p-adic q-integral on ℤ_pas follows (see [6, 7]):

\begin{align} I_{- q} (f) = \int_{ℤ_{p}} f (x) d μ_{- q} (x) & = lim_{N \to \infty} \frac{1}{{[p^{N}]}_{- q}} \sum_{x = 0}^{p^{N} - 1} f (x) {(- q)}^{x}, \\ = lim_{N \to \infty} \frac{{[2]}_{q}}{1 + q^{p^{N}}} \sum_{x = 0}^{p^{N} - 1} f (x) {(- q)}^{x} . \end{align}

(1)

From (1), we note that

q I_{- q} (f_{1}) + I_{- q} (f) = {[2]}_{q} f (0),

where f₁(x) = f(x + 1).

It is well known that the ordinary Euler polynomials are defined by

\frac{2}{e^{t} + 1} e^{x t} = e^{E (x) t} = \sum_{n = 0}^{\infty} E_{n} (x) \frac{t^{n}}{n!},

with the usual convention of replacing Eⁿ(x) by E_n(x).

In the special case, x = 0, E_n(0) = E_nare called the n th Euler numbers (see [1–14]).

By (2), we get the following recurrence relation as follows:

E_{0} = 1, and {(E + 1)}^{n} + E = \{\begin{matrix} 2, & if n = 0, \\ 0, & if n > 0 . \end{matrix}

(2)

Recently, (h, q)-Euler numbers are defined by

E_{0, q}^{(h)} = \frac{2}{1 + q^{h}}, and q^{h} {(q E_{q}^{(h)} + 1)}^{n} + E_{q}^{(h)} = \{\begin{matrix} 2, & if n = 0, \\ 0, & if n > 0, \end{matrix}

with the usual convention about replacing ${(E_{q}^{(h)})}^{n}$ by $E_{n, q}^{(h)}$ (see [1–16]).

Note that $\lim_{q \to 1} E_{n, q}^{(h)} = E_{n}$ .

Let $T_{p} = \cup_{N \geq 1} C_{p^{N}} = \lim_{N \to \infty} C_{p^{N}}$ , where $C_{p^{N}} = {w | w^{p^{N}} = 1}$ is the cyclic group of order p^N. For w ∈ T_p, we denote by ϕ_w: ℤ_p→ ℂ_pthe locally constant function x ↦ w^x.

For α ∈ ℕ and w ∈ T_p, the twisted q-Euler numbers with weight α are also defined by

Ẽ_{0, q, w}^{(α)} = \frac{{[2]}_{q}}{w q + 1}, and w q {(q^{α} Ẽ_{q, w}^{(α)} + 1)}^{n} + Ẽ_{n, q, w}^{(α)} = \{\begin{matrix} {[2]}_{q}, & if n = 0, \\ 0, & if n > 0, \end{matrix}

with the usual convention about replacing ${(Ẽ_{q, w}^{(α)})}^{n}$ by $Ẽ_{n, q, w}^{(α)}$ (see [2, 5]).

The main purpose of this article is to present a systemic study of some families of higher-order-twisted q-Euler numbers and polynomials with weight α. In Section 2, we investigate higher-order-twisted q-Euler numbers and polynomials with weight α and establish interesting properties. In Sections 3, 4, and 5, we observe some properties for special cases.

2. Higher-order-twisted q-Euler numbers and polynomials with weight α

For h ∈ ℤ, α, k ∈ ℕ, w ∈ T_pand n ∈ ℤ₊, let us consider the expansion of higher-order-twisted q-Euler polynomials with weight α as follows:

\begin{gathered} Ẽ_{n, q, w}^{(α)} (h, k | x) \\ = \underset{k - times}{\underset{⏟}{\int_{ℤ_{p}} \dots \int_{ℤ_{p}} w}} \sum_{i = 1}^{k} x_{i} {[\sum_{i = 1}^{k} x_{i} + x]}_{q^{α}}^{n} q^{x_{1} (h - 1) + \dots + x_{k} (h - k)} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k}) . \end{gathered}

(3)

From (1) and (3), we note that

Ẽ_{n, q, w}^{(α)} (h, k | x) = \frac{{[2]}_{q}^{k}}{{(1 - q^{α})}^{n}} \sum_{l = 0}^{n} (\begin{matrix} \begin{matrix} n \\ l \end{matrix} \end{matrix}) {(- 1)}^{l} \frac{q^{α l x}}{(1 + w q^{α l + h}) \dots (1 + w q^{α l + h - k + 1})} .

(4)

In the special case, x = 0 $Ẽ_{n, q, w}^{(α)} (h, k | 0) = Ẽ_{n, q, w}^{(α)} (h, k)$ are called the higher-order-twisted q-Euler numbers with weight α.

By (3), we get

Ẽ_{n, q, w}^{(α)} (h, k) = (q^{α} - 1) Ẽ_{n + 1, q, w}^{(α)} (h - α, k) + Ẽ_{n, q, w}^{(α)} (h - α, k) .

(5)

From (5) and mathematical induction, we get the following theorem.

Theorem 1. For α, k ∈ ℕ and n ∈ ℤ₊, we have

\begin{gathered} \sum_{i = 0}^{n - 1} {(- 1)}^{i - 1} {(q^{α} - 1)}^{n - 1 - i} Ẽ_{n - i, q, w}^{(α)} (h, k) \\ = {(q^{α} - 1)}^{n - 1} Ẽ_{n, q, w}^{(α)} (h - α, k) + {(- 1)}^{n} E_{1, q, w}^{(α)} (h - α, k) . \end{gathered}

For complex number q ∈ ℂ_p, m ∈ ℤ₊, we get the following;

\begin{align} q^{α (x_{1} + \dots + x_{k + 1}) m} & = {(1 - (1 - q^{α (x_{1} + \dots + x_{k + 1})}))}^{m} \\ = \sum_{l = 0}^{m} {(\begin{matrix} m \\ l \end{matrix}) {(- 1)}^{l} (1 - q^{α (x_{1} + \dots + x_{k + 1})})}^{l} \\ = \sum_{l = 0}^{m} (\begin{matrix} m \\ l \end{matrix}) {(- 1)}^{l} {(1 - q^{α})}^{l} \frac{{(1 - q^{α (x_{1} + \dots + x_{k + 1})})}^{l}}{{(1 - q^{α})}^{l}} \\ = \sum_{l = 0}^{m} (\begin{matrix} m \\ l \end{matrix}) {(- 1)}^{l} {(1 - q^{α})}^{l} {[x_{1} + x_{2} + \dots + x_{k + 1}]}_{q^{α}}^{_{l}} . \end{align}

From (3), (4), and above property, we have

\begin{align} Ẽ_{0, q, w}^{(α)} (m α, k + 1) \\ = \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{\sum_{j = 1}^{k + 1} x_{j}} q^{\sum_{j = 1}^{k + 1} (m α - j) x_{j}} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k + 1}) \\ = \sum_{l = 0}^{m} (\begin{matrix} m \\ l \end{matrix}) {(q^{α} - 1)}^{l} \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{\sum_{j = 1}^{k + 1} x_{j}} {[\sum_{j = 1}^{k + 1} x_{j}]}_{q^{α}}^{l} q^{- \sum_{j = 1}^{k + 1} j x_{j}} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k + 1}) \\ = \sum_{l = 0}^{m} (\begin{matrix} m \\ l \end{matrix}) {(q^{α} - 1)}^{l} Ẽ_{l, q, w}^{(α)} (0, k + 1) \\ = \frac{{[2]}_{q}^{k + 1}}{(1 + w q^{α m}) (1 + w q^{α m - 1}) \dots (1 + w q^{α m - k})} . \end{align}

(6)

From (3), we can derive the following equation.

\begin{gathered} \sum_{j = 0}^{i} (\begin{matrix} i \\ j \end{matrix}) {(q^{α} - 1)}^{j} \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{\sum_{s = 1}^{k} x_{s}} {[\sum_{s = 1}^{k} x_{s}]}_{q^{α}}^{n - i + j} q^{\sum_{s = 1}^{k} (h - α - s) x_{s}} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k}) \\ = \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{\sum_{s = 1}^{k} x_{s}} {[\sum_{s = 1}^{k} x_{s}]}_{q^{α}}^{n - i} q^{\sum_{s = 1}^{k} (h - s) x_{s}} q^{α (\sum_{s = 1}^{k} x_{s}) (i - 1)} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k}) \\ = \sum_{j = 0}^{i - 1} {(q^{α} - 1)}^{j} (\begin{matrix} i - 1 \\ j \end{matrix}) Ẽ_{n - i + j, q, w}^{(α)} (h, k) . \end{gathered}

(7)

By (3), (4), (5), and (6), we see that

\sum_{j = 0}^{i} {(q^{α} - 1)}^{j} (\begin{matrix} i \\ j \end{matrix}) Ẽ_{n - 1 + j, q, w}^{(α)} (h - α, k) = \sum_{j = 0}^{i - 1} {(q^{α} - 1)}^{j} (\begin{matrix} i - 1 \\ j \end{matrix}) Ẽ_{n - i + j, q, w}^{(α)} (h, k) .

Therefore, we obtain the following theorem.

Theorem 2. For α, k ∈ ℕ and n, i ∈ ℤ₊, we have

\sum_{j = 0}^{i} (\begin{matrix} i \\ j \end{matrix}) {(q^{α} - 1)}^{j} Ẽ_{n - i + j, q, w}^{(α)} (h - α, k) = \sum_{j = 0}^{i - 1} {(q^{α} - 1)}^{j} (\begin{matrix} i - 1 \\ j \end{matrix}) Ẽ_{n - i + j, q, w}^{(α)} (h, k) .

By simple calculation, we easily see that

\sum_{j = 0}^{m} (\begin{matrix} m \\ j \end{matrix}) {(q^{α} - 1)}^{j} Ẽ_{j, q, w}^{(α)} (0, k) = \frac{{[2]}_{q}^{k}}{(1 + w q^{α m}) (1 + w q^{α m - 1}) \dots (1 + w q^{α m - k + 1})} .

3. Polynomials $Ẽ_{n, q, w}^{(α)} (0, k | x)$

We now consider the polynomials $Ẽ_{n, q, w}^{(α)} (0, k | x)$ (in q^x) by

\begin{gathered} Ẽ_{n, q, w}^{(α)} (0, k | x) \\ = \underset{k - times}{\underset{⏟}{\int_{ℤ_{p}} \dots \int_{ℤ_{p}}}} w^{x_{1} + \dots + x_{k}} {[x + \sum_{i = 1}^{k} x_{i}]}_{q^{α}}^{n} q^{- \sum_{j = 1}^{k} j x_{j}} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k}) . \end{gathered}

(8)

By (8) and (4), we get

{(q^{α} - 1)}^{n} Ẽ_{n, q, w}^{(α)} (0, k | x) = {[2]}_{q}^{k} \sum_{l = 0}^{n} (\begin{matrix} n \\ l \end{matrix}) q^{α l x} {(- 1)}^{n - 1} \frac{1}{(1 + w q^{α l}) \dots (1 + w q^{α l - k + 1})} .

(9)

From (8) and (9), we can derive the following equation.

\begin{gathered} \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{x_{1} + \dots + x_{k}} q^{\sum_{j = 1}^{k} (α n - j) x_{j} + α n x} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k}) \\ = \sum_{j = 0}^{n} (\begin{matrix} n \\ j \end{matrix}) {[α]}_{q}^{j} {(q - 1)}^{j} Ẽ_{j, q, w}^{(α)} (0, k | x), \end{gathered}

and

\begin{align} \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{x_{1} + \dots + x_{k}} q^{\sum_{j = 1}^{k} (α n - j) x_{j} + α n x} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k}) \\ = \frac{{[2]}_{q}^{k} q^{α n x}}{(1 + w q^{α n}) \dots (1 + w q^{α n - k + 1})} . \end{align}

(10)

Therefore, by (9) and (10), we obtain the following theorem.

Theorem 3. For α ∈ ℕ and n, k ∈ ℤ₊, we have

Ẽ_{n, q, w}^{(α)} (0, k | x) = \frac{{[2]}_{q}^{k}}{{[α]}_{q}^{n} {(1 - q)}^{n}} \sum_{l = 0}^{n} (\begin{matrix} n \\ l \end{matrix}) {(- 1)}^{l} q^{α l x} \frac{1}{{(- w q^{α l - k + 1} : q)}_{k}},

and

\sum_{l = 0}^{n} (\begin{matrix} n \\ l \end{matrix}) {[α]}_{q}^{l} {(q - 1)}^{l} Ẽ_{l, q, w}^{(α)} (0, k | x) = \frac{q^{α n x} {[2]}_{q}^{k}}{{(- w q^{α n - k + 1} : q)}_{k}},

where (a : q)₀ = 1 and (a : q)_k= (1 - a)(1 - aq) ⋯ (1 - aq^k-1).

Let d ∈ ℕ with d ≡ 1 (mod 2). Then we have

\begin{align} \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{x_{1} + \dots + x_{k}} {[x + \sum_{j = 1}^{k} x_{j}]}_{q^{α}}^{n} q^{- \sum_{j = 1}^{k} j x_{j}} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k}) \\ = \frac{{[d]}_{q^{α}}^{n}}{{[d]}_{- q}^{k}} \sum_{a_{1}, \dots, a_{k} = 0}^{d - 1} w^{a_{1} + \dots + a_{k}} q^{- \sum_{j = 2}^{k} (j - 1) a_{j}} {(- 1)}^{\sum_{j = 1}^{k} a_{j}} \times \\ \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{d (x_{1} + \dots + x_{k})} {[\frac{x + \sum_{j = 1}^{k} a_{j}}{d} + \sum_{j = 1}^{k} x_{j}]}_{q^{α d}}^{n} q^{- d \sum_{j = 1}^{k} j x_{j}} d μ_{- q^{d}} (x_{1}) \dots d μ_{- q^{d}} (x_{k}) \end{align}

(11)

Thus, by (11), we obtain the following theorem.

Theorem 4. For d ∈ ℕ with d ≡ 1 (mod 2), we have

\begin{align} Ẽ_{n, q, w}^{(α)} (0, k | x) \\ = \frac{{[d]}_{q^{α}}^{n}}{{[d]}_{- q}^{k}} \sum_{a_{1}, \dots, a_{k} = 0}^{d - 1} {(- w)}^{a_{1} + \dots + a_{k}} q^{- \sum_{j = 2}^{k} (j - 1) a_{j}} Ẽ_{n, q^{d}, w^{d}}^{(α)} (0, k | \frac{x + a_{1} + \dots + a_{k}}{d}) . \end{align}

Moreover,

\begin{gathered} Ẽ_{n, q, w}^{(α)} (0, k | d x) \\ = \frac{{[d]}_{q^{α}}^{n}}{{[d]}_{- q}^{k}} \sum_{a_{1}, \dots, a_{k} = 0}^{d - 1} {(- w)}^{a_{1} + \dots + a_{k}} q^{- \sum_{j = 2}^{k} (j - 1) a_{j}} Ẽ_{n, q^{d}, w^{d}}^{(α)} (0, k | x + \frac{a_{1} + \dots + a_{k}}{d}) . \end{gathered}

By (8), we get

\begin{array}{l} {\tilde{E}}_{n, q, w}^{(α)} (0, k | x = \sum_{l = 0}^{n} (\begin{matrix} n \\ l \end{matrix}) {[x]}_{q^{α}}^{n - l} q^{α l x} {\tilde{E}}_{l, q, w}^{(α)} (0, k) \\ = {({[x]}_{q^{α}} + q^{α x} {\tilde{E}}_{q, w}^{(α)} (0, k))}^{n}, \end{array}

where $Ẽ_{n, q, w}^{(α)} (0, k | 0) = Ẽ_{n, q, w}^{(α)} (0, k)$ .

Thus, we note that

\begin{array}{l} {\tilde{E}}_{n, q, w}^{(α)} (0, k | x + y) = \sum_{l = 0}^{n} (\begin{matrix} n \\ l \end{matrix}) {[y]}_{q^{α}}^{n - l} q^{α l y} {\tilde{E}}_{l, q, w}^{(α)} (0, k | x) \\ = {({[y]}_{q^{α}} + q^{α y} {\tilde{E}}_{q, w}^{(α)} (0, k | x))}^{n} . \end{array}

4. Polynomials $Ẽ_{n, q, w}^{(α)} (h, 1 | x)$

Let us define polynomials $Ẽ_{n, q, w}^{(α)} (h, 1 | x)$ as follows:

Ẽ_{n, q, w}^{(α)} (h, 1 | x) = \int_{ℤ_{p}} w^{x_{1}} {[x + x_{1}]}_{q^{α}}^{n} q^{x_{1} (h - 1)} d μ_{- q} (x_{1}) .

(12)

From (12), we have

Ẽ_{n, q, w}^{(α)} (h, 1 | x) = \frac{{[2]}_{q}}{{(1 - q^{α})}^{n}} \sum_{l = 0}^{n} (\begin{matrix} n \\ l \end{matrix}) {(- 1)}^{l} q^{α l x} \frac{1}{(1 + w q^{α l + h})} .

By the calculation of the fermionic p-adic q- integral on ℤ_p, we see that

\begin{gathered} q^{α x} \int_{ℤ_{p}} w^{x_{1}} {[x + x_{1}]}_{q^{α}}^{n} q^{x_{1} (h - 1)} d μ_{- q} (x_{1}) \\ = (q^{α} - 1) \int_{ℤ_{p}} w^{x_{1}} {[x + x_{1}]}_{q^{α}}^{n + 1} q^{x_{1} (h - α - 1)} d μ_{- q} (x_{1}) + \int_{ℤ_{p}} w^{x_{1}} {[x + x_{1}]}_{q^{α}}^{n} q^{x_{1} (h - α - 1)} d μ_{- q} (x_{1}) . \end{gathered}

(13)

Thus, by (13), we obtain the following theorem.

Theorem 5. For α ∈ ℕ and h ∈ ℤ, we have

q^{α x} Ẽ_{n, q, w}^{(α)} (h, 1 | x) = (q^{α} - 1) Ẽ_{n + 1, q, w}^{(α)} (h - α, 1 | x) + Ẽ_{n, q, w}^{(α)} (h - α, 1 | x) .

It is easy to show that

\begin{align} Ẽ_{n, q, w}^{(α)} (h, 1 | x) & = \int_{ℤ_{p}} w^{x_{1}} {[x + x_{1}]}_{q^{α}}^{n} q^{x_{1} (h - 1)} d μ_{- q} (x_{1}) \\ = \sum_{l = 0}^{n} (\begin{matrix} n \\ l \end{matrix}) {[x]}_{q^{α}}^{n - 1} q^{α l x} \int_{ℤ_{p}} w^{x_{1}} {[x_{1}]}_{q^{α}}^{l} q^{x_{1} (h - 1)} d μ_{- q} (x_{1}) \\ = \sum_{l = 0}^{n} (\begin{matrix} n \\ l \end{matrix}) {[x]}_{q^{α}}^{n - 1} q^{α l x} Ẽ_{l, q, w}^{(α)} (h, 1) \\ = {(q^{α x} Ẽ_{q, w}^{(α)} (h, 1) + {[x]}_{q^{α}})}^{n}, for n \geq 1, \end{align}

(14)

with the usual convention about replacing ${(Ẽ_{q, w}^{(α)} (h, 1))}^{n}$ by $Ẽ_{n, q, w}^{(α)} (h, 1)$ .

From qI_-q(f₁) + I_-q(f) = [2]_qf(0), we have

\begin{align} w q^{h} \int_{ℤ_{p}} w^{x_{1}} {[x + x_{1} + 1]}_{q^{α}}^{n} q^{x_{1} (h - 1)} d μ_{- q} (x_{1}) + \int_{ℤ_{p}} w^{x_{1}} {[x + x_{1}]}_{q^{α}}^{n} q^{x_{1} (h - 1)} d μ_{- q} (x_{1}) \\ = {[2]}_{q} {[x]}_{q^{α}}^{n} . \end{align}

(15)

By (13) and (15), we get

w q^{h} Ẽ_{n, q, w}^{(α)} (h, 1 | x + 1) + Ẽ_{n, q, w}^{(α)} (h, 1 | x) = {[2]}_{q} {[x]}_{q^{α}}^{n} .

(16)

For x = 0 in (16), we have

w q^{h} Ẽ_{n, q, w}^{(α)} (h, 1 | 1) + Ẽ_{n, q, w}^{(α)} (h, 1) = \{\begin{matrix} {[2]}_{q}, & if n = 0, \\ 0, & if n > 0 . \end{matrix}

(17)

Therefore, by (14) and (17), we obtain the following theorem.

Theorem 6. For h ∈ ℤ and n ∈ ℤ₊, we have

w q^{h} {(q^{α} Ẽ_{q, w}^{(α)} (h, 1) + 1)}^{n} Ẽ_{n, q, w}^{(α)} (h, 1) = \{\begin{matrix} {[2]}_{q}, & if n = 0, \\ 0, & if n > 0, \end{matrix}

with the usual convention about replacing ${(Ẽ_{q, w}^{(α)} (h, 1))}^{n}$ by $Ẽ_{n, q, w}^{(α)} (h, 1)$ .

From the fermionic p-adic q-integral on ℤ_p, we easily get

Ẽ_{0, q, w}^{(α)} (h, 1) = \int_{ℤ_{p}} w^{x_{1}} q^{x_{1} (h - 1)} d μ_{- q} (x_{1}) = \frac{{[2]}_{q}}{{[2]}_{w q^{h}}} .

By (12), we see that

\begin{align} Ẽ_{n, q^{- 1}, w^{- 1}}^{(α)} (h, 1 | 1 - x) = \int_{ℤ_{p}} w^{- 1} {[1 - x + x_{1}]}_{q^{- α}}^{n} q^{- x_{1} (h - 1)} d μ_{- q^{- 1}} (x_{1}) \\ = {(- 1)}^{n} w q^{α n + h - 1} \frac{{[2]}_{q}}{{(1 - q^{α})}^{n}} \sum_{l = 0}^{n} (\begin{matrix} n \\ l \end{matrix}) {(- 1)}^{l} q^{α l x} \frac{1}{1 + w q^{α l + h}} \\ = {(- 1)}^{n} w q^{α n + h - 1} Ẽ_{n, q, w}^{(α)} (h, 1 | x) \end{align}

(18)

Therefore, by (18), we obtain the following theorem.

Theorem 7. For α ∈ ℕ, h ∈ ℤ and n ∈ ℤ₊, we have

Ẽ_{n, q^{- 1}, w^{- 1}}^{(α)} (h, 1 | 1 - x) = {(- 1)}^{n} w q^{α n + h - 1} Ẽ_{n, q, w}^{(α)} (h, 1 | x) .

In particular, for x = 1, we get

\begin{align} Ẽ_{n, q, w}^{(α)} (h, 1) \\ = {(- 1)}^{n} w q^{α n + h - 1} Ẽ_{n, q, w}^{(α)} (h, 1 | 1) \\ = {(- 1)}^{n + 1} q^{α n - 1} Ẽ_{n, q, w}^{(α)} (h, 1) if n \geq 1 . \end{align}

Let d ∈ ℕ with d ≡ 1 (mod 2). Then we have

\begin{align} \int_{ℤ_{p}} w^{x_{1}} q^{x_{1} (h - 1)} {[x + x_{1}]}_{q^{α}}^{n} d μ_{- q} (x_{1}) \\ = \frac{{[d]}_{q^{α}}^{n}}{{[d]}_{- q}} \sum_{a = 0}^{d - 1} w^{a} q^{h a} {(- 1)}^{a} \int_{ℤ_{p}} w^{d x_{1}} {[\frac{x + a}{d} + x_{1}]}_{q^{α d}}^{n} q^{x_{1} (h - 1) d} d μ_{- q^{d}} (x_{1}) . \end{align}

(19)

Therefore, by (19), we obtain the following theorem.

Theorem 8 (Multiplication formula). For d ∈ ℕ with d ≡ 1 (mod 2), we have

Ẽ_{n, q, w}^{(α)} (h, 1 | x) = \frac{{[d]}_{q^{α}}^{n}}{{[d]}_{- q}} \sum_{a = 0}^{d - 1} w^{a} q^{h a} {(- 1)}^{q} Ẽ_{n, q^{d}, w^{d}}^{(α)} (h, 1 | \frac{x + a}{d}) .

5. Polynomials $Ẽ_{n, q, w}^{(α)} (h, k | x)$ and k= h

In (3), we know that

\begin{align} Ẽ_{n, q, w}^{(α)} (h, k | x) \\ = \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{x_{1} + \dots + x_{k}} {[x_{1} + \dots + x_{k} + x]}_{q^{α}}^{n} q^{(h - 1) x_{1} + \dots + (h - k) x_{k}} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k}) . \end{align}

Thus, we get

{(q^{α} - 1)}^{n} Ẽ_{n, q, w}^{(α)} (h, k | x) = {[2]}_{q}^{k} \sum_{l = 0}^{n} (\begin{matrix} n \\ l \end{matrix}) {(- 1)}^{n - l} \frac{q^{α l x}}{(1 + w q^{α l + h}) \dots (1 + w q^{α l + h - k + 1})},

and

\begin{align} w q^{h} \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{x_{1} + \dots + x_{k}} {[x + 1 + \sum_{i = 1}^{k} x_{i}]}_{q^{α}}^{n} q^{\sum_{i = 1}^{k} (h - i) x_{i}} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k}) \\ = - \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{x_{1} + \dots + x_{k}} {[x + \sum_{i = 1}^{k} x_{i}]}_{q^{α}}^{n} q^{\sum_{i = 1}^{k} (h - i) x_{i}} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k}) \\ + {[2]}_{q} \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{x_{2} + \dots + x_{k}} {[x + \sum_{i = 2}^{k} x_{i}]}_{q^{α}}^{n} q^{\sum_{i = 2}^{k} (h - i) x_{i}} d μ_{- q} (x_{2}) \dots d μ_{- q} (x_{k}) . \end{align}

(20)

Therefore, by (3) and (20), we obtain the following theorem.

Theorem 9. For h ∈ ℤ, α ∈ ℕ and n ∈ ℤ₊, we have

w q^{h} Ẽ_{n, q, w}^{(α)} (h, k | x + 1) + Ẽ_{n, q, w}^{(α)} (h, k | x) = {[2]}_{q} Ẽ_{n, q, w}^{(α)} (h - 1, k - 1 | x) .

Note that

\begin{array}{l} q^{α x} \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{x_{1} + \dots + w_{k}} [x + \sum_{i = 1}^{k} x_{i}]_{q^{α}}^{n} q^{\sum_{i = 1}^{k} (h - i) x_{i}} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k}) \\ = (q^{α} - 1) \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{x_{1} + \dots + x_{k}} {[x + \sum_{i = 1}^{k} x_{i}]}_{q^{α}}^{n + 1} q^{\sum_{i = 1}^{k} (h - α - i) x_{i}} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k}) \\ + \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{x_{1} + \dots + x_{k}} [x + \sum_{i = 1}^{k} x_{i}]_{q^{α}}^{n} q^{\sum_{i = 1}^{k} (h - α - i) x_{i}} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k}) \\ = (q^{α} - 1) {\tilde{E}}_{n + 1, q, w}^{(α)} (h - α, k | x) + {\tilde{E}}_{n, q, w}^{(α)} (h - α, k | x) . \end{array}

(21)

Therefore, by (21), we obtain the following theorem.

Theorem 10. For n ∈ ℤ₊, we have

q^{α x} Ẽ_{n, q, w}^{(α)} (h, k | x) = (q^{α} - 1) Ẽ_{n + 1, q, w}^{(α)} (h - α, k | x) + Ẽ_{n, q, w}^{(α)} (h - α, k | x) .

Let d ∈ ℕ with d ≡ 1 (mod 2). Then we get

\begin{array}{l} \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{x_{1} + \dots + x_{k}} [x + \sum_{j = 1}^{k} x_{j}]_{q^{α}}^{n} q^{\sum_{j = 1}^{k} (h - j) x_{j}} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k}) \\ = \frac{{[d]}_{q^{α}}^{n}}{{[d]}_{- q}^{k}} \sum_{a_{1}, \dots, a_{k} = 0}^{d - 1} w^{a_{1} + \dots + a_{k}} q^{h \sum_{j = 1}^{k} a j - \sum_{j = 2}^{k} (j - 1) a_{j}} {(- 1)}^{\sum_{j = 1}^{k} a_{j}} \times \\ \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{d (x_{1} + \dots + x_{k})} {[\frac{x + \sum_{j = 1}^{k} a_{j}}{d} + \sum_{j = 1}^{k} x_{j}]}_{q^{α d}}^{n} q^{d \sum_{j = 1}^{k} (h - j) x_{j}} d μ_{- q^{d}} (x_{1}) \dots d μ_{- q^{d}} (x_{k}) . \end{array}

(22)

Therefore, by (22), we obtain the following theorem.

Theorem 11. For d ∈ ℕ with d ≡ 1 (mod 2), we have

\begin{align} Ẽ_{n, q, w}^{(α)} (h, k | d x) \\ = \frac{{[d]}_{q^{α}}^{n}}{{[d]}_{- q}^{k}} \sum_{a_{1}, \dots, a_{k} = 0}^{d - 1} w^{a_{1} + \dots + a_{k}} q^{h \sum_{j = 1}^{k} a j - \sum_{j = 2}^{k} (j - 1) a_{j}} {(- 1)}^{\sum_{j = 1}^{k} a_{j}} Ẽ_{n, q^{d}, w^{d}}^{(α)} (h, k | x + \frac{a_{1} + \dots + a_{k}}{d}) . \end{align}

Let $Ẽ_{n, q, w}^{(α)} (k, k | x) = Ẽ_{n, q, w}^{(α)} (k | x)$ . Then we get

{(q^{α} - 1)}^{n} Ẽ_{n, q, w}^{(α)} (k | x) = \sum_{l = 0}^{n} (\begin{matrix} n \\ l \end{matrix}) {(- 1)}^{n - l} q^{α l x} \frac{{[2]}_{q}^{k}}{(1 + w q^{α l + k}) \dots (1 + w q^{α l + 1})},

and

\begin{align} \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{- (x_{1} + \dots + x_{k})} {[k - x + \sum_{i = 1}^{k} x_{i}]}_{q^{- α}}^{n} q^{- \sum_{i = 1}^{k} (k - i) x_{i}} d μ_{- q^{- 1}} (x_{1}) \dots d μ_{- q^{- 1}} (x_{k}) \\ = \frac{q^{(\begin{matrix} k \\ 2 \end{matrix})}}{{(1 - q^{- α})}^{n}} {[2]}_{q}^{k} \sum_{l = 0}^{n} (\begin{matrix} n \\ l \end{matrix}) {(- 1)}^{l} q^{α l x} \frac{1}{(1 + w q^{α l + 1}) \dots (1 + w q^{α l + k})} \\ = {(- 1)}^{n} q^{n α} q^{(\begin{matrix} k \\ 2 \end{matrix})} \frac{{[2]}_{q}^{k}}{{(1 - q^{α})}^{n}} \sum_{l = 0}^{n} \frac{(\begin{matrix} n \\ l \end{matrix}) {(- 1)}^{l} q^{α l x}}{(1 + w q^{α l + 1}) \dots (1 + w q^{α l + k})} \\ = {(- 1)}^{n} q^{α n + (\begin{matrix} k \\ 2 \end{matrix})} Ẽ_{n, q, w}^{(α)} (k | x) . \end{align}

(23)

Therefore, by (23), we obtain the following theorem.

Theorem 12. For n ∈ ℤ₊, we have

Ẽ_{n, q^{- 1}, w^{- 1}}^{(α)} (k | k - x) = {(- 1)}^{n} w^{k} q^{α n + (\begin{matrix} k \\ 2 \end{matrix})} Ẽ_{n, q, w}^{(α)} (k | x) .

Let x = k in Theorem 12. Then we see that

Ẽ_{n, q^{- 1}, w^{- 1}}^{(α)} (k | 0) = {(- 1)}^{n} w^{k} q^{α n + (\begin{matrix} k \\ 2 \end{matrix})} Ẽ_{n, q, w}^{(α)} (k | k) .

(24)

From (15), we note that

w q^{k} Ẽ_{n, q, w}^{(α)} (k | x + 1) + Ẽ_{n, q, w}^{(α)} (k | x) = {[2]}_{q} Ẽ_{n, q, w}^{(α)} (k - 1 | x) .

(25)

It is easy to show that

{(q^{α} - 1)}^{n} Ẽ_{n, q, w}^{(α)} (k | 0) = \sum_{l = 0}^{n} (\begin{matrix} n \\ l \end{matrix}) {(- 1)}^{l + n} \frac{{[2]}_{q}^{k}}{(1 + w q^{α l + 1}) \dots (1 + w q^{α l + k})} .

By simple calculation, we get

\begin{align} \sum_{l = 0}^{n} (\begin{matrix} n \\ l \end{matrix}) {(q^{α} - 1)}^{l} \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{\sum_{i = 1}^{k} x_{k}} {[\sum_{i = 1}^{k} x_{k}]}_{q^{α}}^{l} q^{\sum_{l = i}^{k} (k - i) x_{i}} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k}) \\ = \frac{{[2]}_{q}^{k}}{(1 + w q^{α n + k}) (1 + w q^{α n + k - 1}) \dots (1 + w q^{α n + 1})} . \end{align}

(26)

From (26), we note that

\sum_{l = 0}^{n} (\begin{matrix} n \\ l \end{matrix}) {(q^{α} - 1)}^{l} Ẽ_{l, q, w}^{(α)} (k | 0) = \frac{{[2]}_{q}^{k}}{(1 + w q^{α n + k}) (1 + w q^{α n + k - 1}) \dots (1 + w q^{α n + 1})},

and

\begin{align} Ẽ_{n, q, w}^{(α)} (k | x) & = \int_{ℤ_{p}} \dots \int_{ℤ_{p}} w^{\sum_{i = 1}^{k} x_{k}} {[x + \sum_{i = 1}^{k} x_{k}]}_{q^{α}}^{n} q^{\sum_{i = 1}^{k} (k - i) x_{i}} d μ_{- q} (x_{1}) \dots d μ_{- q} (x_{k}) \\ = \sum_{l = 0}^{n} (\begin{matrix} n \\ l \end{matrix}) {[x]}_{q^{α}}^{n - l} q^{α l x} Ẽ_{l, q, w}^{(α)} (k | 0) \\ = {(q^{x α} Ẽ_{q, w}^{(α)} (k | 0) + {[x]}_{q^{α}})}^{n}, n \in ℤ_{+}, \end{align}

with the usual convention about replacing ${(Ẽ_{q, w}^{(α)} (k | 0))}^{n}$ by $Ẽ_{n, q, w}^{(α)} (k | 0)$ .

Put x = 0 in (25), we get

w q^{k} Ẽ_{n, q, w}^{(α)} (k | 1) + Ẽ_{n, q, w}^{(α)} (k | 0) = {[2]}_{q} Ẽ_{n, q}^{(α)} (k - 1 | 0) .

Thus, we have

w q^{k} {(q^{α} Ẽ_{q, w}^{(α)} (k | 0) + 1)}^{n} + Ẽ_{n, q, w}^{(α)} (k | 0) = {[2]}_{q} Ẽ_{n, q, w}^{(α)} (k - 1 | 0),

with the usual convention about replacing ${(Ẽ_{q, w}^{(α)} (k | 0))}^{n}$ by $Ẽ_{n, q, w}^{(α)} (k | 0)$ .

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Department of Mathematics, Hannam University, Daejeon, 306-791, Korea
Hui Young Lee, Nam Soon Jung, Jung Yoog Kang & Cheon Seoung Ryoo

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Hui Young Lee
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Cheon Seoung Ryoo
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Lee, H.Y., Jung, N.S., Kang, J.Y. et al. Some identities on the higher-order-twisted q-Euler numbers and polynomials with weight α. Adv Differ Equ 2012, 21 (2012). https://doi.org/10.1186/1687-1847-2012-21

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Received: 19 September 2011
Accepted: 29 February 2012
Published: 29 February 2012
DOI: https://doi.org/10.1186/1687-1847-2012-21

Keywords

Euler numbers and polynomials
q-Euler numbers and polynomials
higher-order-twisted q-Euler numbers and polynomials with weight α

Some identities on the higher-order-twisted q-Euler numbers and polynomials with weight α

Abstract

1. Introduction

2. Higher-order-twisted q-Euler numbers and polynomials with weight α

3. Polynomials Ẽ n , q , w ( α ) ( 0 , k | x )

4. Polynomials Ẽ n , q , w ( α ) ( h , 1 | x )

5. Polynomials Ẽ n , q , w ( α ) ( h , k | x ) and k= h

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Keywords

3. Polynomials $Ẽ_{n, q, w}^{(α)} (0, k | x)$

4. Polynomials $Ẽ_{n, q, w}^{(α)} (h, 1 | x)$

5. Polynomials $Ẽ_{n, q, w}^{(α)} (h, k | x)$ and k= h