JP O'Donnell
Jul3-08, 07:09 AM
Hi.
It is stated that the associated Legendre functions change their sign n-m times in the interval -1 <= t <= 1, where t = cos(theta)...
Pnm(t) = {1/(2nn!)}(1 - t2)m/2Dn+m(t2 - 1)n ... Associated Legendre function
I can see how this number arises having differentiated (t2 - 1)n, n+m times. But this is then multiplied by a factor of (1 - t2)m/2, which is a polynomial in t of degree m.
So multiplying both polynomials you have a polynomial of degree [2n - (n+m)] + [m] = n
Where have I gone wrong in my understanding of this?
Thanks
It is stated that the associated Legendre functions change their sign n-m times in the interval -1 <= t <= 1, where t = cos(theta)...
Pnm(t) = {1/(2nn!)}(1 - t2)m/2Dn+m(t2 - 1)n ... Associated Legendre function
I can see how this number arises having differentiated (t2 - 1)n, n+m times. But this is then multiplied by a factor of (1 - t2)m/2, which is a polynomial in t of degree m.
So multiplying both polynomials you have a polynomial of degree [2n - (n+m)] + [m] = n
Where have I gone wrong in my understanding of this?
Thanks