function [ x, y, z, w ] = ld0266 ( )

%*****************************************************************************80
%
%% LD0266 computes the 266 point Lebedev angular grid.
%
%  Modified:
%
%    14 September 2010
%
%  Author:
%
%    Dmitri Laikov
%
%  Reference:
%
%    Vyacheslav Lebedev, Dmitri Laikov,
%    A quadrature formula for the sphere of the 131st
%    algebraic order of accuracy,
%    Russian Academy of Sciences Doklady Mathematics,
%    Volume 59, Number 3, 1999, pages 477-481.
%
%  Parameters:
%
%    Output, real X(N), Y(N), Z(N), W(N), the coordinates
%    and weights of the points.
%
  n = 0;
  x = zeros(266,1);
  y = zeros(266,1);
  z = zeros(266,1);
  w = zeros(266,1);
  a = 0.0;
  b = 0.0;
  v = -0.1313769127326952E-02;
  [ n, x, y, z, w ] = gen_oh ( 1, n, a, b, v, x, y, z, w );
  v = -0.2522728704859336E-02;
  [ n, x, y, z, w ] = gen_oh ( 2, n, a, b, v, x, y, z, w );
  v = 0.4186853881700583E-02;
  [ n, x, y, z, w ] = gen_oh ( 3, n, a, b, v, x, y, z, w );
  a = 0.7039373391585475;
  v = 0.5315167977810885E-02;
  [ n, x, y, z, w ] = gen_oh ( 4, n, a, b, v, x, y, z, w );
  a = 0.1012526248572414;
  v = 0.4047142377086219E-02;
  [ n, x, y, z, w ] = gen_oh ( 4, n, a, b, v, x, y, z, w );
  a = 0.4647448726420539;
  v = 0.4112482394406990E-02;
  [ n, x, y, z, w ] = gen_oh ( 4, n, a, b, v, x, y, z, w );
  a = 0.3277420654971629;
  v = 0.3595584899758782E-02;
  [ n, x, y, z, w ] = gen_oh ( 4, n, a, b, v, x, y, z, w );
  a = 0.6620338663699974;
  v = 0.4256131351428158E-02;
  [ n, x, y, z, w ] = gen_oh ( 4, n, a, b, v, x, y, z, w );
  a = 0.8506508083520399;
  v = 0.4229582700647240E-02;
  [ n, x, y, z, w ] = gen_oh ( 5, n, a, b, v, x, y, z, w );
  a = 0.3233484542692899;
  b = 0.1153112011009701;
  v = 0.4080914225780505E-02;
  [ n, x, y, z, w ] = gen_oh ( 6, n, a, b, v, x, y, z, w );
  a = 0.2314790158712601;
  b = 0.5244939240922365;
  v = 0.4071467593830964E-02;
  [ n, x, y, z, w ] = gen_oh ( 6, n, a, b, v, x, y, z, w );
  
  return
end