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limn

limN is a shorthand used in some texts to denote the limit of a sequence as the index N tends to infinity. The standard notation is lim_{N→∞} a_N, indicating the limit L if the sequence a_N approaches L as N grows without bound.

Formal definition: A sequence {a_N} converges to L if for every ε > 0 there exists an N0

Examples: a_N = 1/N has limit 0. a_N = (−1)^N has no limit because the sequence oscillates between

Notes: In rigorous writing, lim_{N→∞} is preferred; limN without an arrow is informal or used in certain

Related concepts: limsup and liminf describe the limiting superior and inferior values when a sequence does

See also: Notation in calculus, convergence of sequences, asymptotic notation, and limit theorems.

such
that
for
all
N
≥
N0,
|a_N
−
L|
<
ε.
If
such
an
L
exists,
the
limit
is
L;
otherwise
the
sequence
diverges.
−1
and
1.
a_N
=
log
N
/
N
has
limit
0.
contexts.
Limits
are
fundamental
in
defining
convergence
and
in
establishing
asymptotic
behavior
in
analysis,
number
theory,
and
probability.
They
underpin
constants
defined
by
limiting
procedures
and
are
central
to
many
theorems
about
sums,
integrals,
and
series.
not
converge.
Interchange
of
limits
with
sums
or
integrals
can
be
subtle
and
is
governed
by
convergence
theorems
such
as
dominated
convergence
or
monotone
convergence.