24-Jan-2019 15:17:04

GEN_HERMITE_RULE_TEST:
  MATLAB version
  Test GEN_HERMITE_RULE.
24-Jan-2019 15:17:04

GEN_HERMITE_RULE
  MATLAB version

  Compute a generalized Gauss-Hermite rule for approximating
    Integral ( -oo < x < +oo ) |x-a|^ALPHA exp(-b*(x-a)^2) f(x) dx
  of order ORDER.

  The user specifies ORDER, ALPHA, A, B, and FILENAME.

  ORDER is the number of points:
  ALPHA is the exponent of |x|:
  A is the center point (typically 0).
  B is the exponential scale factor (typically 1).
  FILENAME is used to generate 3 files:
    filename_w.txt - the weight file
    filename_x.txt - the abscissa file.
    filename_r.txt - the region file.

  ORDER = 4
  ALPHA = 1.000000
  A = 0.000000
  B = 1.000000
  FILENAME = "gen_herm_o4_a1.0".

  Creating quadrature files.

  "Root" file name is   "gen_herm_o4_a1.0".

  Weight file will be   "gen_herm_o4_a1.0_w.txt".
  Abscissa file will be "gen_herm_o4_a1.0_x.txt".
  Region file will be   "gen_herm_o4_a1.0_r.txt".

GEN_HERMITE_RULE:
  Normal end of execution.

24-Jan-2019 15:17:04

GEN_HERMITE_RULE_TEST:
  Normal end of execution.

24-Jan-2019 15:17:04