The Bernoulli numbers are the rational numbers $B_n$ defined as the coefficients in the expansion $\frac{x}{e^x-1} = \sum_{n \geq 0} B_n \frac{x^n}{n!}$. They vanish when $n$ is odd and greater than $2$. They appear in the values at integers of the Riemann $\zeta$ function. These classical numbers play an important role in number theory and in several other places in mathematics.
Stats
|
created |
13 years, 3 months ago |
|
viewed |
27 times |
|
editors |
0 |
Top Answerers
more »
Recent Hot Answers
Bernoulli sum meets golden numberBernoulli sum meets golden number
2-adic valuation of $L(0,\chi)$ for a Dirichlet character
Where to find or how to prove that the ratio of two Bernoulli polynomials is increasing?
Coefficients in Hirzebruch polynomial and divisibility of Bernoulli numbers: reference request
more »