function [ n_data, x, fx ] = psi_values ( n_data ) %*****************************************************************************80 % %% PSI_VALUES returns some values of the Psi or Digamma function. % % Discussion: % % In Mathematica, the function can be evaluated by: % % PolyGamma[x] % % or % % PolyGamma[0,x] % % PSI(X) = d ln ( Gamma ( X ) ) / d X = Gamma'(X) / Gamma(X) % % PSI(1) = -Euler's constant. % % PSI(X+1) = PSI(X) + 1 / X. % % Licensing: % % This code is distributed under the GNU LGPL license. % % Modified: % % 14 February 2003 % % Author: % % John Burkardt % % Reference: % % Milton Abramowitz and Irene Stegun, % Handbook of Mathematical Functions, % US Department of Commerce, 1964. % % Stephen Wolfram, % The Mathematica Book, % Fourth Edition, % Wolfram Media / Cambridge University Press, 1999. % % Parameters: % % Input/output, integer N_DATA. The user sets N_DATA to 0 before the % first call. On each call, the routine increments N_DATA by 1, and % returns the corresponding data; when there is no more data, the % output value of N_DATA will be 0 again. % % Output, real X, the argument of the function. % % Output, real FX, the value of the function. % n_max = 11; fx_vec = [ ... -0.5772156649015329E+00, ... -0.4237549404110768E+00, ... -0.2890398965921883E+00, ... -0.1691908888667997E+00, ... -0.6138454458511615E-01, ... 0.3648997397857652E-01, ... 0.1260474527734763E+00, ... 0.2085478748734940E+00, ... 0.2849914332938615E+00, ... 0.3561841611640597E+00, ... 0.4227843350984671E+00 ]; x_vec = [ ... 1.0E+00, ... 1.1E+00, ... 1.2E+00, ... 1.3E+00, ... 1.4E+00, ... 1.5E+00, ... 1.6E+00, ... 1.7E+00, ... 1.8E+00, ... 1.9E+00, ... 2.0E+00 ]; if ( n_data < 0 ) n_data = 0; end n_data = n_data + 1; if ( n_max < n_data ) n_data = 0; x = 0.0; fx = 0.0; else x = x_vec(n_data); fx = fx_vec(n_data); end return end