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divergents

Divergents is a term used across mathematics to refer to objects that do not converge under a specified limiting process. The precise meaning depends on context. In analysis, a divergent object is one for which a limit does not exist or is unbounded when a procedure such as taking partial sums, limits along a sequence, or integration is applied.

Divergent series and sequences are common contexts. A series ∑ a_n is divergent if the sequence of

A sequence x_n in a metric space diverges if it fails to converge to any point in

Divergence also appears in vector calculus. The divergence of a vector field F = (F1, F2, F3) is

In addition, improper integrals can be divergent if their limit does not exist, and numerical methods can

partial
sums
S_N
=
∑_{n=1}^N
a_n
does
not
converge
to
a
finite
value.
The
harmonic
series
1
+
1/2
+
1/3
+
…
diverges.
Some
series
may
fail
to
converge
in
more
subtle
ways,
or
diverge
to
infinity.
In
some
mathematical
theories,
divergent
series
can
be
assigned
finite
values
through
regularization,
but
such
values
are
not
universally
regarded
as
true
sums.
that
space.
Divergence
can
occur
when
the
sequence
has
no
limit,
or
when
it
tends
to
infinity
in
an
extended
sense.
In
complex
analysis
or
real
analysis,
divergence
is
distinguished
from
convergence
by
the
nonexistence
of
a
limit.
the
scalar
function
div
F
=
∂F1/∂x
+
∂F2/∂y
+
∂F3/∂z.
This
quantity
measures
the
rate
at
which
“stuff”
is
expanding
or
contracting
at
a
point
and
is
interpreted
as
a
source
or
sink;
fields
with
zero
divergence
are
called
divergence-free.
fail
to
converge,
producing
divergent
behavior.