- #1
BRN
- 108
- 10
Hi at all,
I'm tring to solve Schrodinger equation in spherically symmetry with these bondary conditions:
##\lim_{r \rightarrow 0} u(r)\ltimes r^{l+1}##
##\lim_{r \rightarrow 0} u'(r)\ltimes (l+1)r^{l}##
For eigenvalues, the text I'm following says that I have to consider that the eigenfunctions are tending to zero at the extremes of integration, i.e. ##r = 0## and ##r = 3 * r_{nucl}##
Why I need to consider an eigenfunction=0 in r=0? I would expect it to be maximum at that point...
Some idea?
Thanks.
I'm tring to solve Schrodinger equation in spherically symmetry with these bondary conditions:
##\lim_{r \rightarrow 0} u(r)\ltimes r^{l+1}##
##\lim_{r \rightarrow 0} u'(r)\ltimes (l+1)r^{l}##
For eigenvalues, the text I'm following says that I have to consider that the eigenfunctions are tending to zero at the extremes of integration, i.e. ##r = 0## and ##r = 3 * r_{nucl}##
Why I need to consider an eigenfunction=0 in r=0? I would expect it to be maximum at that point...
Some idea?
Thanks.