-
denoted as ∑ i = 1 n i {\textstyle \sum _{i=1}^{n}i} . For long
summations, and
summations of
variable length (defined with
ellipses or Σ notation), it is...
- In
mathematical analysis, Cesàro
summation (also
known as the Cesàro mean or Cesàro limit) ****igns
values to some
infinite sums that are not necessarily...
-
Ramanujan summation is a
technique invented by the
mathematician Srinivasa Ramanujan for ****igning a
value to
divergent infinite series.
Although the...
-
temporal summations are
important in
chronic pain conditions. Indeed,
through pressure stimulation experiments, it has been
shown that
spatial summation facilitates...
-
Summation notation may
refer to: Capital-sigma notation,
mathematical symbol for
summation Einstein notation,
summation over like-subscripted indices...
- In mathematics,
summation by
parts transforms the
summation of
products of
sequences into
other summations,
often simplifying the com****tion or (especially)...
- In mathematics, Hölder
summation is a
method for
summing divergent series introduced by Hölder (1882).
Given a
series a 1 + a 2 + ⋯ , {\displaystyle a_{1}+a_{2}+\cdots...
- Borel, then an
unknown young man,
discovered that his
summation method gave the 'right'
answer for many
classical divergent series. He
decided to make...
- zeta function. One
important such use of
Poisson summation concerns theta functions:
periodic summations of
Gaussians . Put q = e i π τ {\displaystyle q=e^{i\pi...
- (also
known as the
Einstein summation convention or
Einstein summation notation) is a
notational convention that
implies summation over a set of
indexed terms...
