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Any good references out there?
Basically, my problem is that I have the coefficients of the spherical harmonic decompositon of a function defined on the sphere. The only way I was able to write these down was to define my z axis such that the function was properly azimuthally symmetric.
My decomposition therefore has Clm = 0 if m is not 0.
What I want to be able to do is transform this decomposition into another basis with new z axis pointing in arbitrary theta, phi direction
What I remember of this is that the transformation involves only a sum over m's (not l's) therefore it shouldn't take too much computer time to do (which is good, because I have to transform the bases approximately 3 million times, before doing some other manipulations)
this has something to do with the wigner-eckart theorem, but I don't want to think too hard about it. Therefore, the more cookbooky the reference gets the better.
Basically, my problem is that I have the coefficients of the spherical harmonic decompositon of a function defined on the sphere. The only way I was able to write these down was to define my z axis such that the function was properly azimuthally symmetric.
My decomposition therefore has Clm = 0 if m is not 0.
What I want to be able to do is transform this decomposition into another basis with new z axis pointing in arbitrary theta, phi direction
What I remember of this is that the transformation involves only a sum over m's (not l's) therefore it shouldn't take too much computer time to do (which is good, because I have to transform the bases approximately 3 million times, before doing some other manipulations)
this has something to do with the wigner-eckart theorem, but I don't want to think too hard about it. Therefore, the more cookbooky the reference gets the better.
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