-
series of f {\displaystyle f}
converges uniformly, but not
necessarily absolutely, to f {\displaystyle f} . A
function ƒ has an
absolutely converging...
- mathematics, a
series or
integral is said to be
conditionally convergent if it
converges, but it does not
converge absolutely. More precisely, a
series of real...
-
mathematical field of analysis,
uniform convergence is a mode of
convergence of
functions stronger than
pointwise convergence. A
sequence of
functions ( f n )...
- generally,
given a
converging series of
vectors in a finite-dimensional real
vector space E, the set of sums of
converging rearranged series is an
affine subspace...
- S_{n}=a_{1}+a_{2}+\cdots +a_{n}=\sum _{k=1}^{n}a_{k}.} A
series is
convergent (or
converges) if and only if the
sequence ( S 1 , S 2 , S 3 , … ) {\displaystyle...
-
Absolutely converging series turn into
absolutely converging series,
conditionally converging series turn into
conditionally converging series (with the...
- If ℓ > 1 {\displaystyle \ell >1} , the
series diverges. If L < 1 {\displaystyle L<1} then the
series converges absolutely. If ℓ ≤ 1 ≤ L {\displaystyle...
-
sequences are
exactly the
converging sequences with
respect to that topology. In particular,
there is no
metric of
almost sure
convergence.
Consider a sequence...
-
constant was
named after Eugène
Charles Catalan, who
found quickly-
converging series for its
calculation and
published a
memoir on it in 1865. In low-dimensional...
- the
radius of
convergence of a
power series is the
radius of the
largest disk at the
center of the
series in
which the
series converges. It is either...
