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In the mathematics of convergent and
divergent series In mathematics, a divergent series is an infinite series that is not convergent, meaning that the infinite sequence of the partial sums of the series does not have a finite limit. If a series converges, the individual terms of the series must ...
, Euler summation is a summation method. That is, it is a method for assigning a value to a series, different from the conventional method of taking limits of partial sums. Given a series Σ''a''''n'', if its
Euler transform In combinatorics, the binomial transform is a sequence transformation (i.e., a transform of a sequence) that computes its forward differences. It is closely related to the Euler transform, which is the result of applying the binomial transform to th ...
converges to a sum, then that sum is called the Euler sum of the original series. As well as being used to define values for divergent series, Euler summation can be used to speed the convergence of series. Euler summation can be generalized into a family of methods denoted (E, ''q''), where ''q'' ≥ 0. The (E, 1) sum is the ordinary Euler sum. All of these methods are strictly weaker than
Borel summation In mathematics, Borel summation is a summation method for divergent series, introduced by . It is particularly useful for summing divergent asymptotic series, and in some sense gives the best possible sum for such series. There are several vari ...
; for ''q'' > 0 they are incomparable with
Abel summation In mathematics, a divergent series is an infinite series that is not convergent, meaning that the infinite sequence of the partial sums of the series does not have a finite limit. If a series converges, the individual terms of the series must ...
.


Definition

For some value ''y'' we may define the Euler sum (if it converges for that value of ''y'') corresponding to a particular formal summation as: : _\, \sum_^\infty a_j := \sum_^\infty \frac \sum_^i \binom y^ a_j . If all the formal sums actually converge, the Euler sum will equal the left hand side. However, using Euler summation can accelerate the convergence (this is especially useful for alternating series); sometimes it can also give a useful meaning to divergent sums. To justify the approach notice that for interchanged sum, Euler's summation reduces to the initial series, because :y^\sum_^\infty \binom \frac=1. This method itself cannot be improved by iterated application, as : _ _\sum = \, _ \sum.


Examples

* Using ''y'' = 1 for the formal sum \sum_^\infty (-1)^j P_k(j) we get \sum_^k \frac \sum_^i \binom (-1)^j P_k(j), if ''Pk'' is a polynomial of
degree Degree may refer to: As a unit of measurement * Degree (angle), a unit of angle measurement ** Degree of geographical latitude ** Degree of geographical longitude * Degree symbol (°), a notation used in science, engineering, and mathematics ...
''k''. Note that the inner sum would be zero for , so in this case Euler summation reduces an infinite series to a finite sum. * The particular choice P_k(j):= (j+1)^k provides an explicit representation of the
Bernoulli numbers In mathematics, the Bernoulli numbers are a sequence of rational numbers which occur frequently in analysis. The Bernoulli numbers appear in (and can be defined by) the Taylor series expansions of the tangent and hyperbolic tangent functions, ...
, since \frac=-\zeta(-k) (the
Riemann zeta function The Riemann zeta function or Euler–Riemann zeta function, denoted by the Greek letter (zeta), is a mathematical function of a complex variable defined as \zeta(s) = \sum_^\infty \frac = \frac + \frac + \frac + \cdots for \operatorname(s) > ...
). Indeed, the formal sum in this case diverges since ''k'' is positive, but applying Euler summation to the zeta function (or rather, to the related
Dirichlet eta function In mathematics, in the area of analytic number theory, the Dirichlet eta function is defined by the following Dirichlet series, which converges for any complex number having real part > 0: \eta(s) = \sum_^ = \frac - \frac + \frac - \frac + \cdo ...
) yields (cf. Globally convergent series) \frac\sum_^k \frac \sum_^i \binom (-1)^j (j+1)^k which is of closed form. * \sum_^\infty z^j= \sum_^\infty \frac \sum_^i \binom y^ z^j = \frac \sum_^\infty \left( \frac \right)^i :With an appropriate choice of ''y'' (i.e. equal to or close to −) this series converges to .


See also

*
Binomial transform In combinatorics, the binomial transform is a sequence transformation (i.e., a transform of a sequence) that computes its forward differences. It is closely related to the Euler transform, which is the result of applying the binomial transform to th ...
*
Borel summation In mathematics, Borel summation is a summation method for divergent series, introduced by . It is particularly useful for summing divergent asymptotic series, and in some sense gives the best possible sum for such series. There are several vari ...
*
Cesàro summation In mathematical analysis, Cesàro summation (also known as the Cesàro mean ) assigns values to some infinite sums that are not necessarily convergent in the usual sense. The Cesàro sum is defined as the limit, as ''n'' tends to infinity, of ...
*
Lambert summation In mathematical analysis, Lambert summation is a summability method for a class of divergent series. Definition A series \sum a_n is ''Lambert summable'' to ''A'', written \sum a_n = A \,(\mathrm), if :\lim_ (1-r) \sum_^\infty \frac = A . If a s ...
*
Perron's formula In mathematics, and more particularly in analytic number theory, Perron's formula is a formula due to Oskar Perron to calculate the sum of an arithmetic function, by means of an inverse Mellin transform. Statement Let \ be an arithmetic function, a ...
*
Abelian and Tauberian theorems In mathematics, Abelian and Tauberian theorems are theorems giving conditions for two methods of summing divergent series to give the same result, named after Niels Henrik Abel and Alfred Tauber. The original examples are Abel's theorem showing that ...
*
Abel–Plana formula In mathematics, the Abel–Plana formula is a summation formula discovered independently by and . It states that :\sum_^\infty f(n)=\frac 1 2 f(0)+ \int_0^\infty f(x) \, dx+ i \int_0^\infty \frac \, dt. It holds for functions ''f'' that are holo ...
*
Abel's summation formula In mathematics, Abel's summation formula, introduced by Niels Henrik Abel, is intensively used in analytic number theory and the study of special functions to compute series. Formula Let (a_n)_^\infty be a sequence of real or complex numbers. ...
*
Van Wijngaarden transformation In mathematics and numerical analysis, the van Wijngaarden transformation is a variant on the Euler transform used to accelerate the convergence of an alternating series. One algorithm to compute Euler's transform runs as follows: Compute a row ...
*
Euler–Boole summation Euler–Boole summation is a method for summing alternating series based on Euler's polynomials, which are defined by : \frac=\sum_^\infty E_n(x)\frac. The concept is named after Leonhard Euler and George Boole. The periodic Euler functions are ...


References

* * * {{refend Mathematical series Summability methods