Bernoulli numbers

The sequence of rational numbers $B_0,B_1,\ldots,$ discovered by Jacob Bernoulli [1] in connection with the calculation of the sum of equal powers of natural numbers:

$$\sum_{k=0}^{m-1}k^n=\frac{1}{n+1}\sum_{s=0}^n\binom nsB_sm^{n+1-s}$$

$$n=0,1,\ldots,\quad m=1,2,\ldots.$$

The values of the first Bernoulli numbers are:

$$B_0=1,\quad B_1=-\frac12,\quad B_2=\frac16,\quad B_3=0,$$

$$B_4=-\frac{1}{30},\quad B_5=0,\quad B_6=\frac{1}{42},\quad B_7=0,$$

$$B_8=-\frac{1}{30},\quad B_9=0,\quad B_{10}=\frac{5}{66},\quad B_{11}=0.$$

All odd-indexed Bernoulli numbers except for $B_1$ are zero, and the signs of $B_{2n}$ alternate. Bernoulli numbers are the values of the Bernoulli polynomials at $x=0$: $B_n=B_n(0)$; they also often serve as the coefficients of the expansions of certain elementary functions into power series. Thus, for example,

$$\frac{x}{e^x-1}=\sum_{\nu=0}^\infty B_\nu\frac{x^\nu}{\nu!},\quad|x|<2\pi$$

(the so-called generating function of the Bernoulli numbers);

$$x\operatorname{cotg}x=\sum_{\nu=0}^\infty(-1)^\nu B_{2\nu}\frac{2^{2\nu}}{(2\nu)!}x^{2\nu},\quad|x|<\pi,$$

$$\operatorname{tg}x=\sum_{\nu=1}^\infty|B_{2\nu}|\frac{2^{2\nu}(2^{2\nu}-1)}{(2\nu)!}x^{2\nu},\quad|x|<\frac\pi2.$$

L. Euler in 1740 pointed out the connection between Bernoulli numbers and the values of the Riemann zeta-function $\zeta(s)$ for even $s=2m$:

$$\zeta(2m)=\sum_{\nu=1}^\infty\nu^{-2m}=\frac{(2\pi)^{2m}}{2(2n)!}|B_{2m}|.$$

Bernoulli numbers are used to express many improper integrals, such as

$$\int\limits_0^\infty\frac{x^{2n-1}dx}{e^{2\pi x}-1}=\frac{1}{4n}|B_{2n}|,\quad n=1,2,\ldots.$$

Certain relationships involving Bernoulli numbers are:

$$B_0=1,\quad\sum_{k=0}^{n-1}\binom nkB_k=0,\quad n\geq2,$$

(the recurrence formula);

$$B_{2n}=(-1)^{n-1}4n\int\limits_0^\infty\frac{x^{2n-1}}{e^{2\pi x}-1}dx,\quad n\geq1;$$

$$B_{2n}=(-1)^{n-1}\frac{2(2n)!}{(2\pi)^{2n}}\sum_{s=1}^\infty\frac{1}{s^{2n}},\quad n\geq1.$$

The estimates:

$$\frac{2(2n)!}{(2\pi)^{2n}}<(-1)^{n-1}B_{2n}\leq\frac{\pi^2(2n)!}{3(2\pi)^{2n}},\quad n\geq1,$$

hold. Extensive tables of Bernoulli numbers are available; for instance, [2] contains accurate values of $B_{2n}$ for $n\leq90$ and approximate values for $n\leq250$.

Bernoulli numbers have found many applications in mathematical analysis, number theory and approximate calculations.

References

Comments

Bernoulli numbers play an important role in the theory of cyclotomic fields and Fermat's last theorem, see [a1], pp. 40-41, and [a2]. E.g., if $p$ is an odd prime number that does not divide the numerators of $B_2,B_4,\ldots,B_{p-3}$, then $x^p+y^p=z^p$ has no solutions in $x,y,z\in\mathbf N$. (See also Cyclotomic field; Fermat great theorem.)

References