Difference between revisions of "Solution details"
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− | The modified Bessel functions, first and second, are the solution for the previous equation but the boundary conditions determines which one to use, in this case <math> r'\rightarrow 0</math>, | + | The modified Bessel functions, first I_k and second kind K_k, are the solution for the previous equation but the boundary conditions determines which one to use, in this case <math> r'\rightarrow 0</math>, |
<math> n \rightarrow \infty </math>, and | <math> n \rightarrow \infty </math>, and | ||
<math> n \rightarrow 0 </math> as | <math> n \rightarrow 0 </math> as | ||
<math> r'\rightarrow \infty </math>. | <math> r'\rightarrow \infty </math>. | ||
+ | so |
Revision as of 23:01, 25 October 2013
asymptotic solution details for Boltzmann equation for a hole has a uniform electric field
n + - n = 0
Steps to solve Boltzmann equation
for the previous equation let consider the asymptotic solution has the form:
so
where
and
In spherical coordinates:
which is symmetric in direction.
Assuming
the solution of the zenith angle direction is the Legendre polynomial, and can be written as:
and
so,
The modified Bessel functions, first I_k and second kind K_k, are the solution for the previous equation but the boundary conditions determines which one to use, in this case ,
, and
as
.
so