![PDF) New recurrence relations for spherical harmonic functions and their derivatives | Denis Winch - Academia.edu PDF) New recurrence relations for spherical harmonic functions and their derivatives | Denis Winch - Academia.edu](https://0.academia-photos.com/attachment_thumbnails/51708510/mini_magick20190124-21070-1gp9xsq.png?1548376276)
PDF) New recurrence relations for spherical harmonic functions and their derivatives | Denis Winch - Academia.edu
![SOLVED: Legendre polynomials and spherical harmonics It can be shown that the Legendre polynomials P (z) are related to generating function" P(r)t' V1 - 2tr for Ith 1 and I < Differentiate SOLVED: Legendre polynomials and spherical harmonics It can be shown that the Legendre polynomials P (z) are related to generating function" P(r)t' V1 - 2tr for Ith 1 and I < Differentiate](https://cdn.numerade.com/ask_images/b41ef7f2792d4b48b2d05a38230fc2a7.jpg)
SOLVED: Legendre polynomials and spherical harmonics It can be shown that the Legendre polynomials P (z) are related to generating function" P(r)t' V1 - 2tr for Ith 1 and I < Differentiate
![PDF) Numerical computation of spherical harmonics of arbitrary degree and order by extending exponent of floating point numbers: II first-, second-, and third-order derivatives PDF) Numerical computation of spherical harmonics of arbitrary degree and order by extending exponent of floating point numbers: II first-, second-, and third-order derivatives](https://i1.rgstatic.net/publication/233741467_Numerical_computation_of_spherical_harmonics_of_arbitrary_degree_and_order_by_extending_exponent_of_floating_point_numbers_II_first-_second-_and_third-order_derivatives/links/09e4150af8cdd759c6000000/largepreview.png)