code32.f90

来自「Fortran 90 and HPF Programs Related to t」· F90 代码 · 共 80 行

F90

80 行

!!!!!!!!!!!!!!!!!!!!!!!!!!!   Program 3.12  !!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!                                                                       !! Please Note:                                                          !!                                                                       !! (1) This computer program is written by Tao Pang in conjunction with  !!     his book, "An Introduction to Computational Physics," published   !!     by Cambridge University Press in 1997.                            !!                                                                       !! (2) No warranties, express or implied, are made for this program.     !!                                                                       !!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!MODULE CB  REAL :: Q,B,WEND MODULE CB!PROGRAM PENDULUM!! Main Program for a driven pendulum under damping solved with! the fourth-order Runge-Kutta algorithm.  Parameters: Q, B,! and W (omega_0).  Copyright (c) Tao Pang 1997.!  USE CB  IMPLICIT NONE  INTEGER, PARAMETER :: N=1000,L=100,M=1  INTEGER :: I  REAL :: PI,H,T,Y1,Y2,G1,G1F,G2,G2F  REAL :: DK11,DK21,DK12,DK22,DK13,DK23,DK14,DK24  REAL, DIMENSION (2,N) :: Y!  PI = 4.0*ATAN(1.0)  H  = 3.0*PI/L  Q  = 0.5  B  = 0.9  W  = 2.0/3.0  Y(1,1) = 0.0  Y(2,1) = 2.0!! Using the Runge-Kutta algorithm to integrate the equation!  DO I = 1, N-1    T  = H*I    Y1 = Y(1,I)    Y2 = Y(2,I)    DK11 = H*G1F(Y1,Y2,T)    DK21 = H*G2F(Y1,Y2,T)    DK12 = H*G1F((Y1+DK11/2.0),(Y2+DK21/2.0),(T+H/2.0))    DK22 = H*G2F((Y1+DK11/2.0),(Y2+DK21/2.0),(T+H/2.0))    DK13 = H*G1F((Y1+DK12/2.0),(Y2+DK22/2.0),(T+H/2.0))    DK23 = H*G2F((Y1+DK12/2.0),(Y2+DK22/2.0),(T+H/2.0))    DK14 = H*G1F((Y1+DK13),(Y2+DK23),(T+H))    DK24 = H*G2F((Y1+DK13),(Y2+DK23),(T+H))    Y(1,I+1) = Y(1,I)+(DK11+2.0*(DK12+DK13)+DK14)/6.0    Y(2,I+1) = Y(2,I)+(DK21+2.0*(DK22+DK23)+DK24)/6.0!! Bring theta back to the region [-pi,pi]!    Y(1,I+1) = Y(1,I+1)-2.0*PI*NINT(Y(1,I+1)/(2.0*PI))  END DO  WRITE (6,"(2F16.8)") (Y(1,I),Y(2,I),I=1,N,M)END PROGRAM PENDULUM!FUNCTION G1F (Y1,Y2,T) RESULT (G1)  USE CB  IMPLICIT NONE  REAL :: Y1,Y2,T,G1!  G1 = Y2END FUNCTION G1F!FUNCTION G2F (Y1,Y2,T) RESULT (G2)  USE CB  IMPLICIT NONE  REAL :: Y1,Y2,T,G2!  G2 = -Q*Y2-SIN(Y1)+B*COS(W*T)END FUNCTION G2F

code32.f90 - 源码说明

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