Fourier series of higher-order Bernoulli functions and their applications

In this paper, we study the Fourier series related to higher-order Bernoulli functions and give new identities for higher-order Bernoulli functions which are derived from the Fourier series of them.

As is well known, Bernoulli polynomials are defined by the generating function

When \(x=0\), \(B_{n}=B_{n}(0)\) are called Bernoulli numbers. From (1.1), we note that

with \(\deg B_{n}(x)=n\) (see [9–11]). By (1.1), we easily get

with the usual convention about replacing \(B^{n}\) by \(B_{n}\) (see [9, 10]). From (1.2), we note that

Thus, by (1.4), we get

For any real number x, we define

where \([x]\) is the integral part of x. Then \(B_{n}( \langle x \rangle)\) are functions defined on \((-\infty, \infty)\) and periodic with period 1, which are called Bernoulli functions. The Fourier series for \(B_{m}( \langle x \rangle)\) is given by

where \(m \geq1\) and \(x \notin\mathbb{Z}\) (see [1, 2, 8, 14, 22]). For a positive integer N, we have

For \(r \in\mathbb{N}\), the higher-order Bernoulli polynomials are defined by the generating function

When \(x=0\), \(B_{n}^{(r)}= B_{n}^{(r)}(0)\) are called Bernoulli numbers of order r (see [1, 22]). Then \(B_{n}^{(r)}( \langle x \rangle)\) are functions defined on \((-\infty, \infty)\) and periodic with period 1, which are called Bernoulli functions of order r. In this paper, we study the Fourier series related to higher-order Bernoulli functions and give some new identities for the higher-order Bernoulli functions which are derived from the Fourier series of them.

From (1.8), we note that

Indeed,

Let \(x=0\) in (2.1). Then we have

Now, we assume that \(m \geq1\), \(r \geq2\). \(B_{m}^{(r)}( \langle x \rangle)\) is piecewise \(C^{\infty}\). Further, in view of (2.3), \(B_{m}^{(r)}( \langle x \rangle)\) is continuous for those \((r,m)\) with \(B_{m-1}^{(r-1)}(0) =0\), and is discontinuous with jump discontinuities at integers for those \((r,m)\) with \(B_{m-1}^{(r-1)}(0) \neq0\). The Fourier series of \(B_{m}^{(r)}( \langle x \rangle )\) is

where

Replacing m by \(m-1\) in (2.5), we get

Case 1. Let \(n \neq0\). Then we have

where \((x)_{n} = x(x-1)\cdots(x-n+1)\), for \(n \geq1\), and \((x)_{0}=1\). Now, we observe that

From (2.7) and (2.8), we can derive equation (2.9):

Case 2. Let \(n=0\). Then we have

Before proceeding, we recall the following equations:

and

The series in (2.11) converges uniformly, while that in (2.12) converges pointwise. Assume first that \(B_{m-1}^{(r-1)}(0) =0\). Then we have \(B_{m}^{(r)}(1) = B_{m}^{(r)}(0)\), and \(m \geq2\). As \(B_{m}^{(r)}( \langle x \rangle)\) is piecewise \(C^{\infty}\) and continuous, the Fourier series of \(B_{m}^{(r)}( \langle x \rangle)\) converges uniformly to \(B_{m}^{(r)}( \langle x \rangle)\), and

Note that (2.13) holds whether \(B_{m-1}^{(r-1)}(0)=0\) or not. However, if \(B_{m-1}^{(r-1)}(0)=0\), then

Therefore, we obtain the following theorem.

Theorem 2.1

Let \(m \geq2\), \(r \geq2\). Assume that \(B_{m-1}^{(r-1)}(0)=0\).

1. (a)

   \(B_{m}^{(r)}( \langle x \rangle)\) has the Fourier series expansion

   $$ \begin{aligned} B_{m}^{(r)}\bigl( \langle x \rangle \bigr) = B_{m}^{(r-1)}(0) - \sum_{\substack{n=-\infty\\ n \neq0}}^{\infty}\Biggl(\sum_{k=1}^{m} \frac {(m)_{k}}{(2 \pi in)^{k}}B_{m-k}^{(r-1)} \Biggr) e^{2 \pi inx}, \end{aligned} $$

   for \(x \in(-\infty, \infty)\). Here the convergence is uniform.

2. (b)

   \(B_{m}^{(r)}( \langle x \rangle) = \sum_{\substack{k=0 \\ k \neq1}}^{m} {m \choose k} B_{m-k}^{(r-1)} B_{k} ( \langle x \rangle)\), for all \(x \in(-\infty, \infty)\), where \(B_{k}( \langle x \rangle)\) is the Bernoulli function.

Assume next that \(B_{m-1}^{(r-1)}(0) \neq0\). Then \(B_{m}^{(r)}(1) \neq B_{m}^{(r)}(0)\), and hence \(B_{m}^{(r)}( \langle x \rangle)\) is piecewise \(C^{\infty}\) and discontinuous with jump discontinuities at integers Thus the Fourier series of \(B_{m}^{(r)}( \langle x \rangle)\) converges pointwise to \(B_{m}^{(r)}( \langle x \rangle)\), for \(x \notin\mathbb{Z}\), and converges to \(\frac{1}{2} ( B_{m}^{(r)}(0) + B_{m}^{(r)}(1) ) = B_{m}^{(r)}(0) + \frac{m}{2} B_{m-1}^{(r-1)}(0)\), for \(x \in\mathbb{Z}\). Thus we obtain the following theorem.

Theorem 2.2

Let \(m \geq1\), \(r \geq2\), Assume that \(B_{m-1}^{(r-1)}(0) \neq0\).

Here the convergence is pointwise,

and

where \(B_{k}( \langle x \rangle)\) is the Bernoulli function.

Remark

Let \(\zeta(s) = \sum_{n=1}^{\infty}\frac{1}{n^{s}}\), \(( \operatorname{Re}(s)>1 )\). From (1.7), we note that, for \(m \geq1\),

In this paper, we studied the Fourier series expansion of the higher-order Bernoulli functions \(B_{m}^{(r)}( \langle x \rangle )\) which are obtained by extending by periodicity of period 1 the higher-order Bernoulli polynomials \(B_{m}^{(r)}(x)\) on \([0, 1)\). As it turns out, the Fourier series of \(B_{m}^{(r)}( \langle x \rangle)\) converges uniformly to \(B_{m}^{(r)}( \langle x \rangle)\), if \(B_{m-1}^{(r-1)}(0)=0\), and converges pointwise to \(B_{m}^{(r)}( \langle x \rangle)\) for \(x\notin \Bbb {Z}\) and converges to \(B_{m}^{(r)}+\frac{m}{2}B_{m-1}^{(r-1)}\) for \(x\in\Bbb {Z}\), if \(B_{m-1}^{(r-1)}(0)\neq0\). Here the Fourier series of the higher-order Bernoulli functions \(B_{m}^{(r)}( \langle x \rangle)\) are explicitly determined. In addition, in each case the Fourier series of the higher-order Bernoulli functions \(B_{m}^{(r)}( \langle x \rangle)\) are expressed in terms of Bernoulli functions which are obtained by extending by periodicity of period 1 the ordinary Bernoulli polynomials \(B_{m}(x)\) on \([0, 1)\). The Fourier series expansion of the Bernoulli functions are useful in computing the special values of the Dirichlet L-functions. For details, one is referred to [24].

It is expected that the Fourier series of the higher-order Bernoulli functions will find some applications in connections with a certain generalization of Dirichlet L-functions and higher-order generalized Bernoulli numbers.

In this paper, we considered the Fourier series expansion of the higher-order Bernoulli functions \(B_{m}^{(r)}( \langle x \rangle )\) which are obtained by extending by periodicity of period 1 the higher-order Bernoulli polynomials \(B_{m}^{(r)}(x)\) on \([0, 1)\). The Fourier series are explicitly determined. Depending on whether \(B_{m-1}^{(r-1)}(0)\) is zero or not, the Fourier series of \(B_{m}^{(r)}( \langle x \rangle)\) converges uniformly to \(B_{m}^{(r)}( \langle x \rangle)\) or converges pointwise to \(B_{m}^{(r)}( \langle x \rangle)\) for \(x\notin\Bbb {Z}\) and converges to \(B_{m}^{(r)}+\frac {m}{2}B_{m-1}^{(r-1)}\) for \(x\in\Bbb {Z}\). In addition, the Fourier series of the higher-order Bernoulli functions \(B_{m}^{(r)}( \langle x \rangle)\) are expressed in terms of Bernoulli functions \(B_{k}( \langle x \rangle)\). Thus we established the relations between higher-order Bernoulli functions and Bernoulli functions. Just as the Fourier series expansion of the Bernoulli functions are useful in computing the special values of Dirichlet L-functions, we would like to see some applications to a certain generalization of Dirichlet L-functions and higher-order generalized Bernoulli numbers in near future.

This paper is supported by grant NO 14-11-00022 of Russian Scientific Fund.

Authors and Affiliations

1. Department of Mathematics, Kwangwoon University, Seoul, 139-701, Republic of Korea

   Taekyun Kim

2. Department of Mathematics, College of Science, Tianjin Polytechnic University, Tianjin, 300160, China

   Taekyun Kim

3. Department of Mathematics, Sogang University, Seoul, 121-742, Republic of Korea

   Dae San Kim

4. Department of Mathematics Education, Kyungpook National University, Taegu, 702-701, Republic of Korea

   Seog-Hoon Rim

5. Hanrimwon, Kwangwoon University, Seoul, 139-701, Republic of Korea

   Dmitry V. Dolgy

6. School of Natural Sciences, Far Eastern Federal University, 690950, Vladivostok, Russia

   Dmitry V. Dolgy

Corresponding author

Correspondence to Taekyun Kim.

Competing interests

The authors declare that they have no competing interests.

Authors’ contributions

All authors contributed equally to the manuscript and typed, read, and approved the final manuscript.

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