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In mathematics, the Bernoulli polynomials occur in the study of many special functions and in particular the Riemann zeta function and the Hurwitz zeta function. This is in large part because they are an Appell sequence, i.e. a Sheffer sequence for the ordinary derivative operator. Unlike orthogonal polynomials, the Bernoulli polynomials are remarkable in that the number of crossings of the x-axis in the unit interval does not go up as the degree of the polynomials goes up. In the limit of large degree, the Bernoulli polynomials, appropriately scaled, approach the sine and cosine functions.

File:Bernoulli polynomials.svg

Representations

The Bernoulli polynomials B_n admit a variety of different representations. Which among them should be taken to be the definition may depend on one's purposes.

Explicit formula

${\displaystyle B_n(x)={\displaystyle \sum _{k=0}^n}(\genfrac{}{}{0ex}{}{n}{k})b_{n-k}{x}^k,}$

for n ≥ 0, where b_k are the Bernoulli numbers.

Generating functions

The generating function for the Bernoulli polynomials is

${\displaystyle \frac{t{e}^{xt}}{e^t-1}={\displaystyle \sum _{n=0}^{\mathrm{\infty }}}{B}_n(x)\frac{t^n}{n!}.}$

The generating function for the Euler polynomials is

${\displaystyle \frac{2e^{xt}}{e^t+1}={\displaystyle \sum _{n=0}^{\mathrm{\infty }}}{E}_n(x)\frac{t^n}{n!}.}$

Representation by a differential operator

The Bernoulli polynomials are also given by

${\displaystyle B_n(x)=\frac{D}{e^D-1}{x}^n}$

where D = d/dx is differentiation with respect to x and the fraction is expanded as a formal power series. It follows that

${\displaystyle {\displaystyle \underset{a}{\overset{x}{\int }}}{B}_n(u)du=\frac{B_{n+1}(x)-B_{n+1}(a)}{n+1}.}$

cf. #Integrals below.

Representation by an integral operator

The Bernoulli polynomials are the unique polynomials determined by

${\displaystyle {\displaystyle \underset{x}{\overset{x+1}{\int }}}{B}_n(u)du=x^n.}$

The integral transform

${\displaystyle (Tf)(x)={\displaystyle \underset{x}{\overset{x+1}{\int }}}f(u)du}$

on polynomials f, simply amounts to

${\displaystyle \begin{array}{rl}(Tf)(x)=\frac{e^D-1}{D}f(x)& ={\displaystyle \sum _{n=0}^{\mathrm{\infty }}}\frac{D^n}{(n+1)!}f(x)\\ & =f(x)+\frac{f^{\prime }(x)}{2}+\frac{f^{″}(x)}{6}+\frac{f^{‴}(x)}{24}+\cdots .\end{array}}$

This can be used to produce the #Inversion formulas below.

Another explicit formula

An explicit formula for the Bernoulli polynomials is given by

${\displaystyle B_m(x)={\displaystyle \sum _{n=0}^m}\frac{1}{n+1}{\displaystyle \sum _{k=0}^n}(-1{)}^k(\genfrac{}{}{0ex}{}{n}{k})(x+k{)}^m.}$

Note the remarkable similarity to the globally convergent series expression for the Hurwitz zeta function. Indeed, one has

${\displaystyle B_n(x)=-n\zeta (1-n,x)}$

where ζ(s, q) is the Hurwitz zeta; thus, in a certain sense, the Hurwitz zeta generalizes the Bernoulli polynomials to non-integer values of n.

The inner sum may be understood to be the nth forward difference of x^m; that is,

${\displaystyle {\mathrm{\Delta }}^n{x}^m={\displaystyle \sum _{k=0}^n}(-1{)}^{n-k}(\genfrac{}{}{0ex}{}{n}{k})(x+k{)}^m}$

where Δ is the forward difference operator. Thus, one may write

${\displaystyle B_m(x)={\displaystyle \sum _{n=0}^m}\frac{(-1{)}^n}{n+1}{\mathrm{\Delta }}^n{x}^m.}$

This formula may be derived from an identity appearing above as follows. Since the forward difference operator Δ equals

${\displaystyle \mathrm{\Delta }=e^D-1}$

where D is differentiation with respect to x, we have, from the Mercator series

${\displaystyle \frac{D}{e^D-1}=\frac{\log (\mathrm{\Delta }+1)}{\mathrm{\Delta }}={\displaystyle \sum _{n=0}^{\mathrm{\infty }}}\frac{(-\mathrm{\Delta }{)}^n}{n+1}.}$

As long as this operates on an mth-degree polynomial such as x^m, one may let n go from 0 only up to m.

An integral representation for the Bernoulli polynomials is given by the Nörlund–Rice integral, which follows from the expression as a finite difference.

An explicit formula for the Euler polynomials is given by

${\displaystyle E_m(x)={\displaystyle \sum _{n=0}^m}\frac{1}{2^n}{\displaystyle \sum _{k=0}^n}(-1{)}^k(\genfrac{}{}{0ex}{}{n}{k})(x+k{)}^m.}$

This may also be written in terms of the Euler numbers E_k as

${\displaystyle E_m(x)={\displaystyle \sum _{k=0}^m}(\genfrac{}{}{0ex}{}{m}{k})\frac{E_k}{2^k}{(x-\frac{1}{2})}^{m-k}.}$

Sums of pth powers

We have

${\displaystyle {\displaystyle \sum _{k=0}^x}{k}^p=\frac{B_{p+1}(x+1)-B_{p+1}(0)}{p+1}.}$

See Faulhaber's formula for more on this.

The Bernoulli and Euler numbers

The Bernoulli numbers are given by ${\displaystyle B_n=B_n(0).}$ An alternate convention defines the Bernoulli numbers as ${\displaystyle B_n=B_n(1)}$. This definition gives B_n = −nζ(1 − n) where for n = 0 and n = 1 the expression −nζ(1 − n) is to be understood as lim_x → n −xζ(1 − x). The two conventions differ only for n = 1 since B₁(1) = 1/2 = −B₁(0).

The Euler numbers are given by ${\displaystyle E_n=2^n{E}_n(1/2).}$

Explicit expressions for low degrees

The first few Bernoulli polynomials are:

${\displaystyle B_0(x)=1}$

${\displaystyle B_1(x)=x-1/2}$

${\displaystyle B_2(x)=x^2-x+1/6}$

${\displaystyle B_3(x)=x^3-\frac{3}{2}{x}^2+\frac{1}{2}x}$

${\displaystyle B_4(x)=x^4-2x^3+x^2-\frac{1}{30}}$

${\displaystyle B_5(x)=x^5-\frac{5}{2}{x}^4+\frac{5}{3}{x}^3-\frac{1}{6}x}$

${\displaystyle B_6(x)=x^6-3x^5+\frac{5}{2}{x}^4-\frac{1}{2}{x}^2+\frac{1}{42}.}$

The first few Euler polynomials are

${\displaystyle E_0(x)=1}$

${\displaystyle E_1(x)=x-1/2}$

${\displaystyle E_2(x)=x^2-x}$

${\displaystyle E_3(x)=x^3-\frac{3}{2}{x}^2+\frac{1}{4}}$

${\displaystyle E_4(x)=x^4-2x^3+x}$

${\displaystyle E_5(x)=x^5-\frac{5}{2}{x}^4+\frac{5}{2}{x}^2-\frac{1}{2}}$

${\displaystyle E_6(x)=x^6-3x^5+5x^3-3x.}$

Maximum and minimum

At higher n, the amount of variation in B_n(x) between x = 0 and x = 1 gets large. For instance,

${\displaystyle B_{16}(x)=x^{16}-8x^{15}+20x^{14}-\frac{182}{3}{x}^{12}+\frac{572}{3}{x}^{10}-429x^8+\frac{1820}{3}{x}^6-\frac{1382}{3}{x}^4+140x^2-\frac{3617}{510}}$

which shows that the value at x = 0 (and at x = 1) is −3617/510 ≈ −7.09, while at x = 1/2, the value is 118518239/3342336 ≈ +7.09. D.H. Lehmer^[1] showed that the maximum value of B_n(x) between 0 and 1 obeys

${\displaystyle M_n<\frac{2n!}{(2\pi {)}^n}}$

unless n is 2 modulo 4, in which case

${\displaystyle M_n=\frac{2\zeta (n)n!}{(2\pi {)}^n}}$

(where ${\displaystyle \zeta (x)}$ is the Riemann zeta function), while the minimum obeys

${\displaystyle m_n>\frac{-2n!}{(2\pi {)}^n}}$

unless n is 0 modulo 4, in which case

${\displaystyle m_n=\frac{-2\zeta (n)n!}{(2\pi {)}^n}.}$

These limits are quite close to the actual maximum and minimum, and Lehmer gives more accurate limits as well.

Differences and derivatives

The Bernoulli and Euler polynomials obey many relations from umbral calculus:

${\displaystyle \mathrm{\Delta }{B}_n(x)=B_n(x+1)-B_n(x)=n{x}^{n-1},}$

${\displaystyle \mathrm{\Delta }{E}_n(x)=E_n(x+1)-E_n(x)=2(x^n-E_n(x)).}$

(Δ is the forward difference operator).

These polynomial sequences are Appell sequences:

${\displaystyle {B_n}^{\prime }(x)=n{B}_{n-1}(x),}$

${\displaystyle {E_n}^{\prime }(x)=n{E}_{n-1}(x).}$

Translations

${\displaystyle B_n(x+y)={\displaystyle \sum _{k=0}^n}(\genfrac{}{}{0ex}{}{n}{k})B_k(x)y^{n-k}}$

${\displaystyle E_n(x+y)={\displaystyle \sum _{k=0}^n}(\genfrac{}{}{0ex}{}{n}{k})E_k(x)y^{n-k}}$

These identities are also equivalent to saying that these polynomial sequences are Appell sequences. (Hermite polynomials are another example.)

Symmetries

${\displaystyle B_n(1-x)=(-1{)}^n{B}_n(x),n\ge 0,}$

${\displaystyle E_n(1-x)=(-1{)}^n{E}_n(x)}$

${\displaystyle (-1{)}^n{B}_n(-x)=B_n(x)+n{x}^{n-1}}$

${\displaystyle (-1{)}^n{E}_n(-x)=-E_n(x)+2x^n}$

Zhi-Wei Sun and Hao Pan ^[2] established the following surprising symmetry relation: If r + s + t = n and x + y + z = 1, then

${\displaystyle r[s,t;x,y{]}_n+s[t,r;y,z{]}_n+t[r,s;z,x{]}_n=0,}$

where

${\displaystyle [s,t;x,y{]}_n={\displaystyle \sum _{k=0}^n}(-1{)}^k(\genfrac{}{}{0ex}{}{s}{k})(\genfrac{}{}{0ex}{}{t}{n-k})B_{n-k}(x)B_k(y).}$

Fourier series

The Fourier series of the Bernoulli polynomials is also a Dirichlet series, given by the expansion

${\displaystyle B_n(x)=-\frac{n!}{(2\pi i{)}^n}\sum _{k=0}\frac{e^{2\pi ikx}}{k^n}=-2n!{\displaystyle \sum _{k=1}^{\mathrm{\infty }}}\frac{\cos (2k\pi x-\frac{n\pi }{2})}{(2k\pi {)}^n}.}$

Note the simple large n limit to suitably scaled trigonometric functions.

This is a special case of the analogous form for the Hurwitz zeta function

${\displaystyle B_n(x)=-\mathrm{\Gamma }(n+1){\displaystyle \sum _{k=1}^{\mathrm{\infty }}}\frac{\exp (2\pi ikx)+e^{i\pi n}\exp (2\pi ik(1-x))}{(2\pi ik{)}^n}.}$

This expansion is valid only for 0 ≤ x ≤ 1 when n ≥ 2 and is valid for 0 < x < 1 when n = 1.

The Fourier series of the Euler polynomials may also be calculated. Defining the functions

${\displaystyle C_{\nu }(x)={\displaystyle \sum _{k=0}^{\mathrm{\infty }}}\frac{\cos ((2k+1)\pi x)}{(2k+1{)}^{\nu }}}$

and

${\displaystyle S_{\nu }(x)={\displaystyle \sum _{k=0}^{\mathrm{\infty }}}\frac{\sin ((2k+1)\pi x)}{(2k+1{)}^{\nu }}}$

for ${\displaystyle \nu >1}$, the Euler polynomial has the Fourier series

${\displaystyle C_{2n}(x)=\frac{(-1{)}^n}{4(2n-1)!}{\pi }^{2n}{E}_{2n-1}(x)}$

and

${\displaystyle S_{2n+1}(x)=\frac{(-1{)}^n}{4(2n)!}{\pi }^{2n+1}{E}_{2n}(x).}$

Note that the ${\displaystyle C_{\nu }}$ and ${\displaystyle S_{\nu }}$ are odd and even, respectively:

${\displaystyle C_{\nu }(x)=-C_{\nu }(1-x)}$

and

${\displaystyle S_{\nu }(x)=S_{\nu }(1-x).}$

They are related to the Legendre chi function ${\displaystyle {\chi }_{\nu }}$ as

${\displaystyle C_{\nu }(x)=\text{Re}{\chi }_{\nu }(e^{ix})}$

and

${\displaystyle S_{\nu }(x)=\text{Im}{\chi }_{\nu }(e^{ix}).}$

Inversion

The Bernoulli and Euler polynomials may be inverted to express the monomial in terms of the polynomials.

Specifically, evidently from the above section on #Representation by an integral operator, it follows that

${\displaystyle x^n=\frac{1}{n+1}{\displaystyle \sum _{k=0}^n}(\genfrac{}{}{0ex}{}{n+1}{k})B_k(x)}$

and

${\displaystyle x^n=E_n(x)+\frac{1}{2}{\displaystyle \sum _{k=0}^{n-1}}(\genfrac{}{}{0ex}{}{n}{k})E_k(x).}$

Relation to falling factorial

The Bernoulli polynomials may be expanded in terms of the falling factorial ${\displaystyle (x{)}_k}$ as

${\displaystyle B_{n+1}(x)=B_{n+1}+{\displaystyle \sum _{k=0}^n}\frac{n+1}{k+1}\left\{\begin{array}{c}n\\ k\end{array}\right\}(x{)}_{k+1}}$

where ${\displaystyle B_n=B_n(0)}$ and

${\displaystyle \left\{\begin{array}{c}n\\ k\end{array}\right\}=S(n,k)}$

denotes the Stirling number of the second kind. The above may be inverted to express the falling factorial in terms of the Bernoulli polynomials:

${\displaystyle (x{)}_{n+1}={\displaystyle \sum _{k=0}^n}\frac{n+1}{k+1}\left[\begin{array}{c}n\\ k\end{array}\right](B_{k+1}(x)-B_{k+1})}$

where

${\displaystyle \left[\begin{array}{c}n\\ k\end{array}\right]=s(n,k)}$

denotes the Stirling number of the first kind.

Multiplication theorems

The multiplication theorems were given by Joseph Ludwig Raabe in 1851:

${\displaystyle B_n(mx)=m^{n-1}{\displaystyle \sum _{k=0}^{m-1}}{B}_n(x+\frac{k}{m})}$

${\displaystyle E_n(mx)=m^n{\displaystyle \sum _{k=0}^{m-1}}(-1{)}^k{E}_n(x+\frac{k}{m})\text{ for }m=1,3,\dots }$

${\displaystyle E_n(mx)=\frac{-2}{n+1}{m}^n{\displaystyle \sum _{k=0}^{m-1}}(-1{)}^k{B}_{n+1}(x+\frac{k}{m})\text{ for }m=2,4,\dots }$

Integrals

Indefinite integrals

${\displaystyle {\displaystyle \underset{a}{\overset{x}{\int }}}{B}_n(t)dt=\frac{B_{n+1}(x)-B_{n+1}(a)}{n+1}}$

${\displaystyle {\displaystyle \underset{a}{\overset{x}{\int }}}{E}_n(t)dt=\frac{E_{n+1}(x)-E_{n+1}(a)}{n+1}}$

Definite integrals

${\displaystyle {\displaystyle \underset{0}{\overset{1}{\int }}}{B}_n(t)B_m(t)dt=(-1{)}^{n-1}\frac{m!n!}{(m+n)!}{B}_{n+m}\text{ for }m,n\ge 1}$

${\displaystyle {\displaystyle \underset{0}{\overset{1}{\int }}}{E}_n(t)E_m(t)dt=(-1{)}^{n}4(2^{m+n+2}-1)\frac{m!n!}{(m+n+2)!}{B}_{n+m+2}}$

Periodic Bernoulli polynomials

A periodic Bernoulli polynomial P_n(x) is a Bernoulli polynomial evaluated at the fractional part of the argument x. These functions are used to provide the remainder term in the Euler–Maclaurin formula relating sums to integrals. The first polynomial is a sawtooth function.

References

• Milton Abramowitz and Irene A. Stegun, eds. Handbook of Mathematical Functions with Formulas, Graphs, and Mathematical Tables, (1972) Dover, New York. (See Chapter 23)

• Template:Apostol IANT (See chapter 12.11)
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