21 February 2014 2:56:37.058 PM QWGW_PRB: FORTRAN77 version Test the QWGW library. TEST01: Compute points and weights for Gauss quadrature with the Chebyshev Type 1 weight w(x) = 1/sqrt(1-x^2). Order N = 5 Interval = [ -1.0000, 1.0000] Abscissas: 1: -0.95105652 2: -0.58778525 3: 0.22622138E-17 4: 0.58778525 5: 0.95105652 Weights: 1: 0.62831853 2: 0.62831853 3: 0.62831853 4: 0.62831853 5: 0.62831853 TEST02: Compute points and weights for Gauss quadrature with the Chebyshev Type 2 weight w(x) = sqrt(1-x^2). Order N = 5 Interval = [ -1.0000, 1.0000] Abscissas: 1: -0.86602540 2: -0.50000000 3: 0.59524903E-16 4: 0.50000000 5: 0.86602540 Weights: 1: 0.13089969 2: 0.39269908 3: 0.52359878 4: 0.39269908 5: 0.13089969 TEST03: Compute points and weights for Gauss quadrature with the Gegenbauer weight w(x) = (1-x^2)^alpha. Order N = 5 ALPHA = 0.2500 Interval = [ -1.0000, 1.0000] Abscissas: 1: -0.88552629 2: -0.51814550 3: 0.68446924E-17 4: 0.51814550 5: 0.88552629 Weights: 1: 0.17104723 2: 0.43055039 3: 0.54484313 4: 0.43055039 5: 0.17104723 TEST04: Compute points and weights for Gauss quadrature with the generalized Hermite weight w(x) = |x|^alpha * exp(-x^2). ALPHA = 2.0000 Order N = 5 Interval = (-oo,+oo) Abscissas: 1: -2.3175048 2: -1.2763900 3: 0.51120300E-15 4: 1.2763900 5: 2.3175048 Weights: 1: 0.28802728E-01 2: 0.31302766 3: 0.20256615 4: 0.31302766 5: 0.28802728E-01 TEST05: Compute points and weights for Gauss quadrature with the generalized Laguerre weight w(x) = x^alpha * exp(-x). Order N = 5 ALPHA = 2.0000 Interval = [0,+oo) Abscissas: 1: 1.0311091 2: 2.8372128 3: 5.6202943 4: 9.6829098 5: 15.828474 Weights: 1: 0.52091740 2: 1.0667059 3: 0.38354972 4: 0.28564234E-01 5: 0.26271281E-03 TEST06: Compute points and weights for Gauss quadrature with the Hermite weight w(x) = exp(-x^2). Order N = 5 Interval = (-oo,+oo) Abscissas: 1: -2.0201829 2: -0.95857246 3: 0.24025794E-15 4: 0.95857246 5: 2.0201829 Weights: 1: 0.19953242E-01 2: 0.39361932 3: 0.94530872 4: 0.39361932 5: 0.19953242E-01 TEST07: Compute points and weights for Gauss quadrature with the Jacobi weight w(x) = (1-x^2)^alpha*(1+x)^beta Order N = 5 ALPHA = 0.2500 BETA = 0.7500 Interval = [ -1.0000, 1.0000] Abscissas: 1: -0.83555320 2: -0.44611318 3: 0.62006953E-01 4: 0.55261375 5: 0.89431840 Weights: 1: 0.87458928E-01 2: 0.33089932 3: 0.53838160 4: 0.49570592 5: 0.21363533 TEST08: Compute points and weights for Gauss quadrature with the Laguerre weight w(x) = exp(-x). Order N = 5 Interval = [0,+oo) Abscissas: 1: 0.26356032 2: 1.4134031 3: 3.5964258 4: 7.0858100 5: 12.640801 Weights: 1: 0.52175561 2: 0.39866681 3: 0.75942450E-01 4: 0.36117587E-02 5: 0.23369972E-04 TEST09: Compute points and weights for Gauss quadrature with the Legendre weight w(x) = 1. Order N = 5 Interval = [ -1.0000, 1.0000] Abscissas: 1: -0.90617985 2: -0.53846931 3: -0.10818539E-15 4: 0.53846931 5: 0.90617985 Weights: 1: 0.23692689 2: 0.47862867 3: 0.56888889 4: 0.47862867 5: 0.23692689 QWGW_PRB: Normal end of execution. 21 February 2014 2:56:37.073 PM