26 August 2014 9:31:12.849 AM LINE_FEKETE_RULE_PRB FORTRAN90 version Test the LINE_FEKETE_RULE library. TEST01: Seek Fekete points in [ -1.00000 , 1.00000 ] using 5001 equally spaced sample points for polynomials of degree M = 5 using the monomial basis and uniform weight. NF = 5 Estimated Fekete points XF: 1: -1.0000000 2: -0.62480000 3: 0.0000000 4: 0.65600000 5: 1.0000000 Sum(WF) = 2.00000 TEST01: Seek Fekete points in [ -1.00000 , 1.00000 ] using 5001 equally spaced sample points for polynomials of degree M = 11 using the monomial basis and uniform weight. NF = 11 Estimated Fekete points XF: 1: -1.0000000 2: -0.89960000 3: -0.70560000 4: -0.56760000 5: -0.41240000 6: -0.46000000E-01 7: 0.30840000 8: 0.49480000 9: 0.65120000 10: 0.88680000 11: 1.0000000 Sum(WF) = 2.00000 TEST01: Seek Fekete points in [ -1.00000 , 1.00000 ] using 5001 equally spaced sample points for polynomials of degree M = 21 using the monomial basis and uniform weight. NF = 21 Estimated Fekete points XF: 1: -1.0000000 2: -0.98240000 3: -0.95160000 4: -0.89760000 5: -0.83800000 6: -0.73680000 7: -0.59720000 8: -0.45240000 9: -0.31840000 10: -0.16880000 11: -0.13200000E-01 12: 0.15520000 13: 0.32680000 14: 0.45280000 15: 0.55880000 16: 0.72280000 17: 0.83240000 18: 0.89240000 19: 0.95000000 20: 0.98160000 21: 1.0000000 Sum(WF) = 2.00000 TEST02: Seek Fekete points in [ -1.00000 , 1.00000 ] using 5001 equally spaced sample points for polynomials of degree M = 5 with the Chebyshev basis. NF = 5 Estimated Fekete points XF: 1: -1.0000000 2: -0.66360000 3: -0.80000000E-02 4: 0.64120000 5: 1.0000000 Sum(WF) = 3.14159 TEST02: Seek Fekete points in [ -1.00000 , 1.00000 ] using 5001 equally spaced sample points for polynomials of degree M = 11 with the Chebyshev basis. NF = 11 Estimated Fekete points XF: 1: -1.0000000 2: -0.93720000 3: -0.78960000 4: -0.56960000 5: -0.29680000 6: 0.80000000E-03 7: 0.30320000 8: 0.57440000 9: 0.79160000 10: 0.93760000 11: 1.0000000 Sum(WF) = 3.14159 TEST02: Seek Fekete points in [ -1.00000 , 1.00000 ] using 5001 equally spaced sample points for polynomials of degree M = 21 with the Chebyshev basis. NF = 21 Estimated Fekete points XF: 1: -1.0000000 2: -0.98400000 3: -0.94480000 4: -0.88360000 5: -0.80120000 6: -0.70000000 7: -0.58200000 8: -0.44960000 9: -0.30640000 10: -0.15640000 11: -0.40000000E-03 12: 0.15480000 13: 0.30760000 14: 0.45080000 15: 0.58240000 16: 0.70040000 17: 0.80120000 18: 0.88320000 19: 0.94440000 20: 0.98360000 21: 1.0000000 Sum(WF) = 3.14159 TEST03: Seek Fekete points in [ -1.00000 , 1.00000 ] using 5001 equally spaced sample points for polynomials of degree M = 5 with the Legendre basis and uniform weight. NF = 5 Estimated Fekete points XF: 1: -1.0000000 2: -0.62160000 3: -0.60000000E-02 4: 0.60480000 5: 1.0000000 Sum(WF) = 2.00000 TEST03: Seek Fekete points in [ -1.00000 , 1.00000 ] using 5001 equally spaced sample points for polynomials of degree M = 11 with the Legendre basis and uniform weight. NF = 11 Estimated Fekete points XF: 1: -1.0000000 2: -0.92240000 3: -0.73880000 4: -0.54640000 5: -0.29480000 6: -0.56000000E-02 7: 0.27960000 8: 0.54120000 9: 0.73800000 10: 0.92160000 11: 1.0000000 Sum(WF) = 2.00000 TEST03: Seek Fekete points in [ -1.00000 , 1.00000 ] using 5001 equally spaced sample points for polynomials of degree M = 21 with the Legendre basis and uniform weight. NF = 21 Estimated Fekete points XF: 1: -1.0000000 2: -0.97840000 3: -0.92600000 4: -0.87120000 5: -0.79480000 6: -0.70160000 7: -0.61280000 8: -0.40600000 9: -0.28640000 10: -0.14800000 11: -0.12000000E-02 12: 0.14600000 13: 0.29080000 14: 0.42080000 15: 0.54240000 16: 0.63120000 17: 0.79440000 18: 0.87080000 19: 0.92600000 20: 0.97840000 21: 1.0000000 Sum(WF) = 2.00000 LINE_FEKETE_RULE_PRB Normal end of execution. 26 August 2014 9:31:12.951 AM