元となった辞書の項目
Riemann zeta function
noun
(number
theory,
analytic
number
theory,
uncountable)
The
function
ζ
defined
by
the
Dirichlet
series
𝜁(s)=∑ₙ₌₁ ᪲1/(nˢ)=1/(1ˢ)+1/(2ˢ)+1/(3ˢ)+1/(4ˢ)+⋯,
which
is
summable
for
points
s
in
the
complex
half-plane
with
real
part
>
1;
the
analytic
continuation
of
said
function,
being
a
holomorphic
function
defined
on
the
complex
numbers
with
pole
at
1.
意味(1)
(number
theory,
analytic
number
theory,
uncountable)
The
function
ζ
defined
by
the
Dirichlet
series
𝜁(s)=∑ₙ₌₁ ᪲1/(nˢ)=1/(1ˢ)+1/(2ˢ)+1/(3ˢ)+1/(4ˢ)+⋯,
which
is
summable
for
points
s
in
the
complex
half-plane
with
real
part
>
1;
the
analytic
continuation
of
said
function,
being
a
holomorphic
function
defined
on
the
complex
numbers
with
pole
at
1.