4 November 2023 2:55:25.820 PM pitcon66_test3(): FORTRAN77 version PITCON sample program. Solve a two point boundary value problem with a parameter lambda, and seek a limit point in lambda. This problem will be run six times. This is run number 1 This run uses the full linear solver DENSLV. This run assumes that the user supplies the jacobian matrix via a subroutine. Step Type of point Lambda 0 Start point 0.00000 PITCON 6.6 University of Pittsburgh continuation code Last modified on 09 September 1994 This version uses LAPACK for linear algebra. This version uses double precision arithmetic. 1 Corrected 0.00000 2 Continuation 0.264435E-01 3 Continuation 0.104600 4 Continuation 0.219656 5 Continuation 0.327554 6 Continuation 0.425474 7 Continuation 0.513405 8 Continuation 0.591469 9 Continuation 0.659916 10 Continuation 0.719109 11 Continuation 0.769502 12 Continuation 0.811616 13 Target point 0.800000 Value of target point 1 0.00000 0.602685E-01 0.118413 0.174305 0.227816 0.278815 0.327169 0.372748 0.415422 0.455064 0.491550 0.524765 0.554596 0.580941 0.603707 0.622811 0.638182 0.649762 0.657507 0.661387 0.661387 0.800000 14 Continuation 0.846018 15 Continuation 0.873303 16 Continuation 0.894068 17 Continuation 0.908904 18 Continuation 0.918385 19 Continuation 0.923057 20 Continuation 0.923436 21 Limit point 0.923282 22 Continuation 0.920003 23 Continuation 0.913206 24 Continuation 0.904857 25 Continuation 0.891133 26 Continuation 0.877626 27 Continuation 0.860121 28 Continuation 0.842782 29 Continuation 0.822586 30 Continuation 0.802513 31 Continuation 0.780519 32 Target point 0.800000 Value of target point 2 0.00000 0.152806 0.303281 0.451047 0.595673 0.736669 0.873486 1.00551 1.13207 1.25242 1.36578 1.47130 1.56811 1.65533 1.73208 1.79754 1.85093 1.89160 1.91902 1.93283 1.93283 0.800000 Jacobians: 57 Factorizations: 57 Solves: 57 Functions: 60 This is run number 2 This run uses the full linear solver DENSLV. This run assumes that PITCON will approximate the jacobian using forward differences. Step Type of point Lambda 0 Start point 0.00000 PITCON 6.6 University of Pittsburgh continuation code Last modified on 09 September 1994 This version uses LAPACK for linear algebra. This version uses double precision arithmetic. 1 Corrected 0.00000 2 Continuation 0.264435E-01 3 Continuation 0.104600 4 Continuation 0.219656 5 Continuation 0.327554 6 Continuation 0.425475 7 Continuation 0.513405 8 Continuation 0.591469 9 Continuation 0.659917 10 Continuation 0.719110 11 Continuation 0.769503 12 Continuation 0.811617 13 Target point 0.800000 Value of target point 1 0.00000 0.602686E-01 0.118413 0.174305 0.227816 0.278815 0.327169 0.372748 0.415422 0.455064 0.491551 0.524765 0.554596 0.580941 0.603707 0.622811 0.638182 0.649762 0.657507 0.661387 0.661387 0.800000 14 Continuation 0.846020 15 Continuation 0.873304 16 Continuation 0.894068 17 Continuation 0.908905 18 Continuation 0.918386 19 Continuation 0.923057 20 Continuation 0.923436 21 Limit point 0.923282 22 Continuation 0.920003 23 Continuation 0.913205 24 Continuation 0.904848 25 Continuation 0.891132 26 Continuation 0.877617 27 Continuation 0.860119 28 Continuation 0.842772 29 Continuation 0.822584 30 Continuation 0.802502 31 Continuation 0.780517 32 Target point 0.800000 Value of target point 2 0.00000 0.152804 0.303277 0.451041 0.595665 0.736659 0.873475 1.00550 1.13206 1.25241 1.36576 1.47128 1.56809 1.65531 1.73206 1.79751 1.85090 1.89157 1.91900 1.93280 1.93280 0.800000 Jacobians: 0 Factorizations: 57 Solves: 57 Functions: 1371 This is run number 3 This run uses the full linear solver DENSLV. This run assumes that PITCON will approximate the jacobian using central differences. Step Type of point Lambda 0 Start point 0.00000 PITCON 6.6 University of Pittsburgh continuation code Last modified on 09 September 1994 This version uses LAPACK for linear algebra. This version uses double precision arithmetic. 1 Corrected 0.00000 2 Continuation 0.264435E-01 3 Continuation 0.104600 4 Continuation 0.219656 5 Continuation 0.327554 6 Continuation 0.425474 7 Continuation 0.513405 8 Continuation 0.591469 9 Continuation 0.659916 10 Continuation 0.719109 11 Continuation 0.769502 12 Continuation 0.811616 13 Target point 0.800000 Value of target point 1 0.00000 0.602685E-01 0.118413 0.174305 0.227816 0.278815 0.327169 0.372748 0.415422 0.455064 0.491550 0.524765 0.554596 0.580941 0.603707 0.622811 0.638182 0.649762 0.657507 0.661387 0.661387 0.800000 14 Continuation 0.846018 15 Continuation 0.873303 16 Continuation 0.894068 17 Continuation 0.908904 18 Continuation 0.918385 19 Continuation 0.923057 20 Continuation 0.923436 21 Limit point 0.923282 22 Continuation 0.920003 23 Continuation 0.913206 24 Continuation 0.904857 25 Continuation 0.891133 26 Continuation 0.877626 27 Continuation 0.860121 28 Continuation 0.842782 29 Continuation 0.822586 30 Continuation 0.802513 31 Continuation 0.780519 32 Target point 0.800000 Value of target point 2 0.00000 0.152806 0.303281 0.451047 0.595673 0.736669 0.873486 1.00551 1.13207 1.25242 1.36578 1.47130 1.56811 1.65533 1.73208 1.79754 1.85093 1.89160 1.91902 1.93283 1.93283 0.800000 Jacobians: 0 Factorizations: 57 Solves: 57 Functions: 2568 This is run number 4 This run uses the banded linear solver BANSLV. This run assumes that the user supplies the jacobian matrix via a subroutine. Step Type of point Lambda 0 Start point 0.00000 PITCON 6.6 University of Pittsburgh continuation code Last modified on 09 September 1994 This version uses LAPACK for linear algebra. This version uses double precision arithmetic. 1 Corrected 0.00000 2 Continuation 0.264435E-01 3 Continuation 0.104600 4 Continuation 0.219656 5 Continuation 0.327554 6 Continuation 0.425474 7 Continuation 0.513405 8 Continuation 0.591469 9 Continuation 0.659916 10 Continuation 0.719109 11 Continuation 0.769502 12 Continuation 0.811616 13 Target point 0.800000 Value of target point 1 0.00000 0.602685E-01 0.118413 0.174305 0.227816 0.278815 0.327169 0.372748 0.415422 0.455064 0.491550 0.524765 0.554596 0.580941 0.603707 0.622811 0.638182 0.649762 0.657507 0.661387 0.661387 0.800000 14 Continuation 0.846018 15 Continuation 0.873303 16 Continuation 0.894068 17 Continuation 0.908904 18 Continuation 0.918385 19 Continuation 0.923057 20 Continuation 0.923436 21 Limit point 0.923282 22 Continuation 0.920003 23 Continuation 0.913206 24 Continuation 0.904857 25 Continuation 0.891133 26 Continuation 0.877626 27 Continuation 0.860121 28 Continuation 0.842782 29 Continuation 0.822586 30 Continuation 0.802513 31 Continuation 0.780519 32 Target point 0.800000 Value of target point 2 0.00000 0.152806 0.303281 0.451047 0.595673 0.736669 0.873486 1.00551 1.13207 1.25242 1.36578 1.47130 1.56811 1.65533 1.73208 1.79754 1.85093 1.89160 1.91902 1.93283 1.93283 0.800000 Jacobians: 57 Factorizations: 57 Solves: 112 Functions: 60 This is run number 5 This run uses the banded linear solver BANSLV. This run assumes that PITCON will approximate the jacobian using forward differences. Step Type of point Lambda 0 Start point 0.00000 PITCON 6.6 University of Pittsburgh continuation code Last modified on 09 September 1994 This version uses LAPACK for linear algebra. This version uses double precision arithmetic. 1 Corrected 0.00000 2 Continuation 0.264435E-01 3 Continuation 0.104600 4 Continuation 0.219656 5 Continuation 0.327554 6 Continuation 0.425475 7 Continuation 0.513405 8 Continuation 0.591469 9 Continuation 0.659917 10 Continuation 0.719110 11 Continuation 0.769503 12 Continuation 0.811617 13 Target point 0.800000 Value of target point 1 0.00000 0.602686E-01 0.118413 0.174305 0.227816 0.278815 0.327169 0.372748 0.415422 0.455064 0.491551 0.524765 0.554596 0.580941 0.603707 0.622811 0.638182 0.649762 0.657507 0.661387 0.661387 0.800000 14 Continuation 0.846020 15 Continuation 0.873304 16 Continuation 0.894068 17 Continuation 0.908905 18 Continuation 0.918386 19 Continuation 0.923057 20 Continuation 0.923436 21 Limit point 0.923282 22 Continuation 0.920003 23 Continuation 0.913205 24 Continuation 0.904848 25 Continuation 0.891132 26 Continuation 0.877617 27 Continuation 0.860119 28 Continuation 0.842772 29 Continuation 0.822584 30 Continuation 0.802502 31 Continuation 0.780517 32 Target point 0.800000 Value of target point 2 0.00000 0.152804 0.303277 0.451041 0.595665 0.736659 0.873475 1.00550 1.13206 1.25241 1.36576 1.47128 1.56809 1.65531 1.73206 1.79751 1.85090 1.89157 1.91900 1.93280 1.93280 0.800000 Jacobians: 0 Factorizations: 57 Solves: 112 Functions: 345 This is run number 6 This run uses the banded linear solver BANSLV. This run assumes that PITCON will approximate the jacobian using central differences. Step Type of point Lambda 0 Start point 0.00000 PITCON 6.6 University of Pittsburgh continuation code Last modified on 09 September 1994 This version uses LAPACK for linear algebra. This version uses double precision arithmetic. 1 Corrected 0.00000 2 Continuation 0.264435E-01 3 Continuation 0.104600 4 Continuation 0.219656 5 Continuation 0.327554 6 Continuation 0.425474 7 Continuation 0.513405 8 Continuation 0.591469 9 Continuation 0.659916 10 Continuation 0.719109 11 Continuation 0.769502 12 Continuation 0.811616 13 Target point 0.800000 Value of target point 1 0.00000 0.602685E-01 0.118413 0.174305 0.227816 0.278815 0.327169 0.372748 0.415422 0.455064 0.491550 0.524765 0.554596 0.580941 0.603707 0.622811 0.638182 0.649762 0.657507 0.661387 0.661387 0.800000 14 Continuation 0.846018 15 Continuation 0.873303 16 Continuation 0.894068 17 Continuation 0.908904 18 Continuation 0.918385 19 Continuation 0.923057 20 Continuation 0.923436 21 Limit point 0.923282 22 Continuation 0.920003 23 Continuation 0.913206 24 Continuation 0.904857 25 Continuation 0.891133 26 Continuation 0.877626 27 Continuation 0.860121 28 Continuation 0.842782 29 Continuation 0.822586 30 Continuation 0.802513 31 Continuation 0.780519 32 Target point 0.800000 Value of target point 2 0.00000 0.152806 0.303281 0.451047 0.595673 0.736669 0.873486 1.00551 1.13207 1.25242 1.36578 1.47130 1.56811 1.65533 1.73208 1.79754 1.85093 1.89160 1.91902 1.93283 1.93283 0.800000 Jacobians: 0 Factorizations: 57 Solves: 112 Functions: 516 4 November 2023 2:55:25.850 PM