- that are
simpler to infer. Two
tauberian theorems of note are the Hardy–Littlewood
tauberian theorem and the
Wiener tauberian theorem. The
Wiener theorem...
- In mathematics,
Abelian and
Tauberian theorems are
theorems giving conditions for two
methods of
summing divergent series to give the same result, named...
- {\displaystyle A} then it is
Lambert summable to A {\displaystyle A} .
Tauberian theorem:
Suppose that ∑ n = 1 ∞ a n {\displaystyle \sum _{n=1}^{\infty...
- → 0 s F ( s ) . {\textstyle \lim _{s\,\to \,0}{sF(s)}.} Conversely, a
Tauberian final value theorem makes ****umptions
about the frequency-domain behaviour...
- 1)} . In
particular one sees that the
Borel polygon is not polygonal. A
Tauberian theorem provides conditions under which convergence of one
summation method...
- In
mathematical analysis, the Hardy–Littlewood
Tauberian theorem is a
Tauberian theorem relating the
asymptotics of the
partial sums of a
series with the...
-
economics (e.g. on the stock-market). Wiener's
tauberian theorem, a 1932
result of Wiener,
developed Tauberian theorems in
summability theory, on the face...
- In
mathematical analysis, Wiener's
tauberian theorem is any of
several related results proved by
Norbert Wiener in 1932. They
provide a
necessary and...
- In mathematics, Littlewood's
Tauberian theorem is a
strengthening of Tauber's
theorem introduced by John
Edensor Littlewood (1911).
Littlewood showed...
- In
mathematical analysis, Haar's
Tauberian theorem named after Alfréd Haar,
relates the
asymptotic behaviour of a
continuous function to
properties of...
