Borel, then an unknown young man, discovered that his summation method gave the 'right' answer for many classical divergent series. He decided to make...

with explicit and natural techniques such as Abel summation, Cesàro summation and Borel summation, and their relationships. The advent of Wiener's tauberian...

divergent, it can be assigned a value of approximately 0.596347 by Borel summation. This series was first considered by Euler, who applied summability...

results in the renormalization of quantum field theories. Borel summation Cesàro summation Divergent series Ramanujan's sum Abel–Plana formula Bruce C...

Nachbin resummation (generalized Borel transform) can be used to sum divergent series that escape to the usual Borel summation or even to solve (asymptotically)...

same. Abel summation Abel's summation formula Abel–Plana formula Abelian and tauberian theorems Almost convergent sequence Borel summation Divergent series...

theorem Borel right process Borel set Borel summation Borel distribution Borel's conjecture about strong measure zero sets (not to be confused with Borel conjecture...

usual formula. The Borel sum of 1 − 2 + 4 − 8 + ⋯ is also ⁠1/3⁠; when Émile Borel introduced the limit formulation of Borel summation in 1896, this was...

functions is identified as one of two broad classes of summation methods, including Abel and Borel summation, by Knopp, Konrad (1990) [1922]. Theory and Application...

In mathematics, Mittag-Leffler summation is any of several variations of the Borel summation method for summing possibly divergent formal power series...

of these methods are strictly weaker than Borel summation; for q > 0 they are incomparable with Abel summation. For some value y we may define the Euler...

which summation methods produce the geometric series formula for which common ratios. One application for this information is the so-called Borel-Okada...

In mathematics, Borel transform may refer to A transform used in Borel summation A generalization of this in Nachbin's theorem This disambiguation page...

Cesàro summation Euler summation Lambert summation Borel summation Summation by parts – transforms the summation of products of into other summations Cesàro...

When a formally divergent series in a QFT is summed using Borel summation, the associated Borel transform of the series can have singularities as a function...

The theory evolved from the summability of divergent series (see Borel summation) and treats analytic functions with isolated singularities. He introduced...

convergence. Summability methods include Cesàro summation, (C,k) summation, Abel summation, and Borel summation, in increasing order of generality (and hence...

anti-Stokes lines meeting at a. Mathematics portal Physics portal Borel summation Berry, M. V. (1988), "Stokes' phenomenon; smoothing a Victorian discontinuity...

Euler summable to 1⁄4. The Euler summability also implies Borel summability, with the same summation value, as it does in general. Saichev and Woyczyński arrive...

_{\alpha \to 0^{+}}\sum _{n}c_{n}e^{-\alpha n^{2}}.} Abel's theorem Borel summation Zel’Dovich, Y. B. (1961). On the theory of unstable states. Sov. Phys...

Abel summation Cesàro summation Lindelöf summation Euler summation Borel summation Mittag-Leffler summation Lambert summation Euler–Boole summation and...

convergent summations over a series of other complex functions, as well as understanding when it is possible to apply techniques such as Borel summation, or...

Borel–Cantelli lemma, Borel–Carathéodory theorem, Heine–Borel theorem, Borel summation, Borel distribution Alexander Borodin, Russian composer and chemist...

many summation methods that respect these manipulations and that do assign a "sum" to Grandi's series. Two of the simplest methods are Cesàro summation and...

formal operations on transseries) using accelero-summation, which is a generalization of Borel summation. Transseries can be formalized in several equivalent...

law of the Jacobi theta function, which is simple to prove via Poisson summation, to the functional equation. Hjalmar Mellin was among the first to study...

generalized Borel theory of summation, and applied this to study problems connected to convergence of complex power series. He defined new summation methods...

terms are simply omitted from the summation since P ( A ∣ B n ) {\displaystyle P(A\mid B_{n})} is finite. The summation can be interpreted as a weighted...

} for any Borel set A, in which the integral is Lebesgue. the cumulative distribution function of X is absolutely continuous. for any Borel set A of real...

is an arbitrary choice. The summation is called a periodic summation of the function f. When gT is a periodic summation of another function, g, then...