@cindex Gegenbauer functions The Gegenbauer polynomials are defined in Abramowitz & Stegun, Chapter 22, where they are known as Ultraspherical polynomials. The functions described in this section are declared in the header file @file{gsl_sf_gegenbauer.h}. @deftypefun double gsl_sf_gegenpoly_1 (double @var{lambda}, double @var{x}) @deftypefunx double gsl_sf_gegenpoly_2 (double @var{lambda}, double @var{x}) @deftypefunx double gsl_sf_gegenpoly_3 (double @var{lambda}, double @var{x}) @deftypefunx int gsl_sf_gegenpoly_1_e (double @var{lambda}, double @var{x}, gsl_sf_result * @var{result}) @deftypefunx int gsl_sf_gegenpoly_2_e (double @var{lambda}, double @var{x}, gsl_sf_result * @var{result}) @deftypefunx int gsl_sf_gegenpoly_3_e (double @var{lambda}, double @var{x}, gsl_sf_result * @var{result}) These functions evaluate the Gegenbauer polynomials @c{$C^{(\lambda)}_n(x)$} @math{C^@{(\lambda)@}_n(x)} using explicit representations for @math{n =1, 2, 3}. @comment Exceptional Return Values: none @end deftypefun @deftypefun double gsl_sf_gegenpoly_n (int @var{n}, double @var{lambda}, double @var{x}) @deftypefunx int gsl_sf_gegenpoly_n_e (int @var{n}, double @var{lambda}, double @var{x}, gsl_sf_result * @var{result}) These functions evaluate the Gegenbauer polynomial @c{$C^{(\lambda)}_n(x)$} @math{C^@{(\lambda)@}_n(x)} for a specific value of @var{n}, @var{lambda}, @var{x} subject to @math{\lambda > -1/2}, @c{$n \ge 0$} @math{n >= 0}. @comment Domain: lambda > -1/2, n >= 0 @comment Exceptional Return Values: GSL_EDOM @end deftypefun @deftypefun int gsl_sf_gegenpoly_array (int @var{nmax}, double @var{lambda}, double @var{x}, double @var{result_array}[]) This function computes an array of Gegenbauer polynomials @c{$C^{(\lambda)}_n(x)$} @math{C^@{(\lambda)@}_n(x)} for @math{n = 0, 1, 2, \dots, nmax}, subject to @math{\lambda > -1/2}, @c{$nmax \ge 0$} @math{nmax >= 0}. @comment Conditions: n = 0, 1, 2, ... nmax @comment Domain: lambda > -1/2, nmax >= 0 @comment Exceptional Return Values: GSL_EDOM @end deftypefun