The 
function is defined through
the equation
 |
(1)
|
where 
is a Bessel
function of the first kind, so
![bei_nu(z)=I[J_nu(ze^(3pii/4))],](/images/equations/Bei/NumberedEquation2.svg) |
(2)
|
where ![I[z]](/images/equations/Bei/Inline3.svg)
is the imaginary
part.
It is implemented in the Wolfram Language as KelvinBei[nu, z].
has the series expansion
![bei_nu(x)=(1/2x)^nusum_(k=0)^infty(sin[(3/4nu+1/2k)pi])/(k!Gamma(nu+k+1))(1/4x^2)^k,](/images/equations/Bei/NumberedEquation3.svg) |
(3)
|
where 
is the gamma
function (Abramowitz and Stegun 1972, p. 379), which can be written in closed
form as
![bei_nu(x)=-1/2ie^(-3piinu/4)x^nu[(-1)^(1/4)x]^(-nu)×[e^(3piinu/2)I_nu((-1)^(1/4)x)-J_nu((-1)^(1/4)x)],](/images/equations/Bei/NumberedEquation4.svg) |
(4)
|
where 
is a modified
Bessel function of the first kind.
The special case 
,
commonly denoted 
,
corresponds to
 |
(5)
|
where 
is the zeroth order Bessel
function of the first kind. The function 
has the series expansion
![bei(z)=sum_(n=0)^infty((-1)^n(1/2z)^(2+4n))/([(2n+1)!]^2).](/images/equations/Bei/NumberedEquation6.svg) |
(6)
|
Closed forms include
 |  | ![1/2i[J_0((-1)^(1/4)z)-I_0((-1)^(1/4)z)]](/images/equations/Bei/Inline13.svg) |
(7)
|
 |  | ![1/2i[I_0((-1)^(3/4)z)-I_0((-1)^(1/4)z)].](/images/equations/Bei/Inline16.svg) |
(8)
|
, 
,
and 
." §1.7 in