associated legendre functions matlab

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chaitanya acharya
chaitanya acharya el 7 de Dic. de 2019
Comentada: David Goodmanson el 17 de Abr. de 2020
In the function legendre(1,-0.7071), the value corresponding to P11(-0.7071) is coming wrong when checked with standard solutions. Matlab is giving the solution as -0.7071. whereas, the actual solution is +0.7071. Please have a look at it. Or please suggest me how to correct it.
One can verify using online calculator in the link. https://keisan.casio.com/exec/system/1287453184
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Tomy Duby
Tomy Duby el 16 de Abr. de 2020
The issue is caused by two different definitions of associated Legendre polynomials:
  • with non-negative integers.
  • is the definition DLMF (Digital Library of Mathematical Functions) and Matlab are using.
The relation between the two definitions for real x is:
This relation is in the printed edition of Abramowitz and Stegun. I could not find it in DLMF.
I hope this helps.
TD
David Goodmanson
David Goodmanson el 17 de Abr. de 2020
Hi Tony,
That's yet another reason why Abramowitz and Stegun is a better book than DLMF. There is a cornocopia of useful equations in A&S, and when they did DLMF you would think they would have supplemented those to make it even better. Instead they threw out a bunch of them and refer you to reference book blah blah blah if you want to find what you need. No excuse for that.

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David Goodmanson
David Goodmanson el 7 de Dic. de 2019
Hi chaitanya,
It's apples and oranges. When the domain of the argument is -1 <= x <= 1, the function is -sqrt(1-x^2). That's what Matlab is doing, and that's what it says it is doing. When the domain is opened up, 0 <= theta < 2pi with x = cos(theta), then the function can become -sin(theta). Both results are in Wikipedia.
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chaitanya acharya
chaitanya acharya el 9 de Dic. de 2019
Run this code: you will understand where the problem is occuring.
theta=linspace(0,2*pi,9);
phi=0;
n=1; m=1;
% legendre calculated from matlab
leg1=legendre(1,cos(theta));
leg_matlab=leg1(m+1,:);
% legendre analytical solution for cos(theta) at n=1 and m=1 is -sin(theta)
leg_analytical=-sin(theta);
figure(1)
plot(leg_matlab)
hold on
plot(leg_analytical)

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