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561 lines
18 KiB
Fortran
561 lines
18 KiB
Fortran
*DECK HWSPLR
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SUBROUTINE HWSPLR (A, B, M, MBDCND, BDA, BDB, C, D, N, NBDCND,
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+ BDC, BDD, ELMBDA, F, IDIMF, PERTRB, IERROR, W)
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C***BEGIN PROLOGUE HWSPLR
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C***PURPOSE Solve a finite difference approximation to the Helmholtz
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C equation in polar coordinates.
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C***LIBRARY SLATEC (FISHPACK)
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C***CATEGORY I2B1A1A
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C***TYPE SINGLE PRECISION (HWSPLR-S)
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C***KEYWORDS ELLIPTIC, FISHPACK, HELMHOLTZ, PDE, POLAR
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C***AUTHOR Adams, J., (NCAR)
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C Swarztrauber, P. N., (NCAR)
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C Sweet, R., (NCAR)
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C***DESCRIPTION
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C
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C Subroutine HWSPLR solves a finite difference approximation to the
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C Helmholtz equation in polar coordinates:
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C
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C (1/R)(d/dR)(R(dU/dR)) + (1/R**2)(d/dTHETA)(dU/dTHETA)
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C
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C + LAMBDA*U = F(R,THETA).
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C
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C
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C
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C
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C * * * * * * * * Parameter Description * * * * * * * * * *
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C
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C * * * * * * On Input * * * * * *
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C
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C A,B
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C The range of R, i.e., A .LE. R .LE. B. A must be less than B
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C and A must be non-negative.
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C
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C M
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C The number of panels into which the interval (A,B) is
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C subdivided. Hence, there will be M+1 grid points in the
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C R-direction given by R(I) = A+(I-1)DR, for I = 1,2,...,M+1,
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C where DR = (B-A)/M is the panel width. M must be greater than 3.
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C
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C MBDCND
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C Indicates the type of boundary condition at R = A and R = B.
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C
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C = 1 If the solution is specified at R = A and R = B.
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C = 2 If the solution is specified at R = A and the derivative of
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C the solution with respect to R is specified at R = B.
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C = 3 If the derivative of the solution with respect to R is
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C specified at R = A (see note below) and R = B.
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C = 4 If the derivative of the solution with respect to R is
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C specified at R = A (see note below) and the solution is
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C specified at R = B.
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C = 5 If the solution is unspecified at R = A = 0 and the
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C solution is specified at R = B.
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C = 6 If the solution is unspecified at R = A = 0 and the
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C derivative of the solution with respect to R is specified
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C at R = B.
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C
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C NOTE: If A = 0, do not use MBDCND = 3 or 4, but instead use
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C MBDCND = 1,2,5, or 6 .
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C
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C BDA
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C A one-dimensional array of length N+1 that specifies the values
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C of the derivative of the solution with respect to R at R = A.
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C When MBDCND = 3 or 4,
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C
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C BDA(J) = (d/dR)U(A,THETA(J)), J = 1,2,...,N+1 .
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C
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C When MBDCND has any other value, BDA is a dummy variable.
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C
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C BDB
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C A one-dimensional array of length N+1 that specifies the values
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C of the derivative of the solution with respect to R at R = B.
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C When MBDCND = 2,3, or 6,
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C
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C BDB(J) = (d/dR)U(B,THETA(J)), J = 1,2,...,N+1 .
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C
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C When MBDCND has any other value, BDB is a dummy variable.
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C
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C C,D
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C The range of THETA, i.e., C .LE. THETA .LE. D. C must be less
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C than D.
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C
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C N
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C The number of panels into which the interval (C,D) is
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C subdivided. Hence, there will be N+1 grid points in the
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C THETA-direction given by THETA(J) = C+(J-1)DTHETA for
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C J = 1,2,...,N+1, where DTHETA = (D-C)/N is the panel width. N
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C must be greater than 3.
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C
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C NBDCND
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C Indicates the type of boundary conditions at THETA = C and
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C at THETA = D.
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C
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C = 0 If the solution is periodic in THETA, i.e.,
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C U(I,J) = U(I,N+J).
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C = 1 If the solution is specified at THETA = C and THETA = D
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C (see note below).
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C = 2 If the solution is specified at THETA = C and the
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C derivative of the solution with respect to THETA is
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C specified at THETA = D (see note below).
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C = 4 If the derivative of the solution with respect to THETA is
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C specified at THETA = C and the solution is specified at
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C THETA = D (see note below).
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C
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C NOTE: When NBDCND = 1,2, or 4, do not use MBDCND = 5 or 6
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C (the former indicates that the solution is specified at
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C R = 0, the latter indicates the solution is unspecified
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C at R = 0). Use instead MBDCND = 1 or 2 .
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C
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C BDC
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C A one-dimensional array of length M+1 that specifies the values
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C of the derivative of the solution with respect to THETA at
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C THETA = C. When NBDCND = 3 or 4,
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C
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C BDC(I) = (d/dTHETA)U(R(I),C), I = 1,2,...,M+1 .
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C
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C When NBDCND has any other value, BDC is a dummy variable.
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C
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C BDD
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C A one-dimensional array of length M+1 that specifies the values
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C of the derivative of the solution with respect to THETA at
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C THETA = D. When NBDCND = 2 or 3,
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C
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C BDD(I) = (d/dTHETA)U(R(I),D), I = 1,2,...,M+1 .
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C
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C When NBDCND has any other value, BDD is a dummy variable.
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C
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C ELMBDA
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C The constant LAMBDA in the Helmholtz equation. If
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C LAMBDA .LT. 0, a solution may not exist. However, HWSPLR will
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C attempt to find a solution.
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C
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C F
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C A two-dimensional array that specifies the values of the right
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C side of the Helmholtz equation and boundary values (if any).
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C For I = 2,3,...,M and J = 2,3,...,N
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C
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C F(I,J) = F(R(I),THETA(J)).
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C
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C On the boundaries F is defined by
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C
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C MBDCND F(1,J) F(M+1,J)
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C ------ ------------- -------------
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C
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C 1 U(A,THETA(J)) U(B,THETA(J))
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C 2 U(A,THETA(J)) F(B,THETA(J))
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C 3 F(A,THETA(J)) F(B,THETA(J))
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C 4 F(A,THETA(J)) U(B,THETA(J)) J = 1,2,...,N+1
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C 5 F(0,0) U(B,THETA(J))
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C 6 F(0,0) F(B,THETA(J))
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C
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C NBDCND F(I,1) F(I,N+1)
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C ------ --------- ---------
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C
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C 0 F(R(I),C) F(R(I),C)
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C 1 U(R(I),C) U(R(I),D)
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C 2 U(R(I),C) F(R(I),D) I = 1,2,...,M+1
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C 3 F(R(I),C) F(R(I),D)
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C 4 F(R(I),C) U(R(I),D)
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C
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C F must be dimensioned at least (M+1)*(N+1).
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C
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C NOTE
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C
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C If the table calls for both the solution U and the right side F
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C at a corner then the solution must be specified.
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C
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C
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C IDIMF
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C The row (or first) dimension of the array F as it appears in the
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C program calling HWSPLR. This parameter is used to specify the
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C variable dimension of F. IDIMF must be at least M+1 .
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C
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C W
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C A one-dimensional array that must be provided by the user for
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C work space. W may require up to 4*(N+1) +
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C (13 + INT(log2(N+1)))*(M+1) locations. The actual number of
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C locations used is computed by HWSPLR and is returned in location
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C W(1).
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C
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C
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C * * * * * * On Output * * * * * *
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C
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C F
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C Contains the solution U(I,J) of the finite difference
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C approximation for the grid point (R(I),THETA(J)),
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C I = 1,2,...,M+1, J = 1,2,...,N+1 .
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C
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C PERTRB
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C If a combination of periodic, derivative, or unspecified
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C boundary conditions is specified for a Poisson equation
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C (LAMBDA = 0), a solution may not exist. PERTRB is a constant,
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C calculated and subtracted from F, which ensures that a solution
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C exists. HWSPLR then computes this solution, which is a least
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C squares solution to the original approximation. This solution
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C plus any constant is also a solution. Hence, the solution is
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C not unique. PERTRB should be small compared to the right side.
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C Otherwise, a solution is obtained to an essentially different
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C problem. This comparison should always be made to insure that a
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C meaningful solution has been obtained.
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C
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C IERROR
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C An error flag that indicates invalid input parameters. Except
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C for numbers 0 and 11, a solution is not attempted.
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C
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C = 0 No error.
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C = 1 A .LT. 0 .
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C = 2 A .GE. B.
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C = 3 MBDCND .LT. 1 or MBDCND .GT. 6 .
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C = 4 C .GE. D.
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C = 5 N .LE. 3
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C = 6 NBDCND .LT. 0 or .GT. 4 .
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C = 7 A = 0, MBDCND = 3 or 4 .
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C = 8 A .GT. 0, MBDCND .GE. 5 .
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C = 9 MBDCND .GE. 5, NBDCND .NE. 0 and NBDCND .NE. 3 .
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C = 10 IDIMF .LT. M+1 .
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C = 11 LAMBDA .GT. 0 .
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C = 12 M .LE. 3
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C
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C Since this is the only means of indicating a possibly incorrect
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C call to HWSPLR, the user should test IERROR after the call.
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C
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C W
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C W(1) contains the required length of W.
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C
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C *Long Description:
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C
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C * * * * * * * Program Specifications * * * * * * * * * * * *
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C
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C Dimension of BDA(N+1),BDB(N+1),BDC(M+1),BDD(M+1),F(IDIMF,N+1),
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C Arguments W(see argument list)
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C
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C Latest June 1, 1976
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C Revision
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C
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C Subprograms HWSPLR,GENBUN,POISD2,POISN2,POISP2,COSGEN,MERGE,
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C Required TRIX,TRI3,PIMACH
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C
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C Special None
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C Conditions
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C
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C Common NONE
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C Blocks
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C
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C I/O
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C
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C Precision Single
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C
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C Specialist Roland Sweet
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C
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C Language FORTRAN
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C
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C History Standardized April 1, 1973
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C Revised January 1, 1976
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C
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C Algorithm The routine defines the finite difference
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C equations, incorporates boundary data, and adjusts
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C the right side of singular systems and then calls
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C GENBUN to solve the system.
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C
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C Space 13430(octal) = 5912(decimal) locations on the NCAR
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C Required Control Data 7600
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C
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C Timing and The execution time T on the NCAR Control Data
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C Accuracy 7600 for subroutine HWSPLR is roughly proportional
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C to M*N*log2(N), but also depends on the input
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C parameters NBDCND and MBDCND. Some typical values
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C are listed in the table below.
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C The solution process employed results in a loss
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C of no more than three significant digits for N and
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C M as large as 64. More detailed information about
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C accuracy can be found in the documentation for
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C subroutine GENBUN which is the routine that
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C solves the finite difference equations.
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C
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C
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C M(=N) MBDCND NBDCND T(MSECS)
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C ----- ------ ------ --------
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C
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C 32 1 0 31
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C 32 1 1 23
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C 32 3 3 36
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C 64 1 0 128
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C 64 1 1 96
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C 64 3 3 142
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C
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C Portability American National Standards Institute FORTRAN.
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C The machine dependent constant PI is defined in
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C function PIMACH.
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C
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C Required COS
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C Resident
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C Routines
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C
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C Reference Swarztrauber, P. and R. Sweet, 'Efficient FORTRAN
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C Subprograms For The Solution Of Elliptic Equations'
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C NCAR TN/IA-109, July, 1975, 138 pp.
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C
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C * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * *
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C
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C***REFERENCES P. N. Swarztrauber and R. Sweet, Efficient Fortran
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C subprograms for the solution of elliptic equations,
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C NCAR TN/IA-109, July 1975, 138 pp.
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C***ROUTINES CALLED GENBUN
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C***REVISION HISTORY (YYMMDD)
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C 801001 DATE WRITTEN
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C 890531 Changed all specific intrinsics to generic. (WRB)
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C 890531 REVISION DATE from Version 3.2
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C 891214 Prologue converted to Version 4.0 format. (BAB)
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C 920501 Reformatted the REFERENCES section. (WRB)
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C***END PROLOGUE HWSPLR
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C
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C
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DIMENSION F(IDIMF,*)
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DIMENSION BDA(*) ,BDB(*) ,BDC(*) ,BDD(*) ,
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1 W(*)
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C***FIRST EXECUTABLE STATEMENT HWSPLR
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IERROR = 0
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IF (A .LT. 0.) IERROR = 1
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IF (A .GE. B) IERROR = 2
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IF (MBDCND.LE.0 .OR. MBDCND.GE.7) IERROR = 3
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IF (C .GE. D) IERROR = 4
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IF (N .LE. 3) IERROR = 5
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IF (NBDCND.LE.-1 .OR. NBDCND.GE.5) IERROR = 6
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IF (A.EQ.0. .AND. (MBDCND.EQ.3 .OR. MBDCND.EQ.4)) IERROR = 7
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IF (A.GT.0. .AND. MBDCND.GE.5) IERROR = 8
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IF (MBDCND.GE.5 .AND. NBDCND.NE.0 .AND. NBDCND.NE.3) IERROR = 9
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IF (IDIMF .LT. M+1) IERROR = 10
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IF (M .LE. 3) IERROR = 12
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IF (IERROR .NE. 0) RETURN
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MP1 = M+1
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DELTAR = (B-A)/M
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DLRBY2 = DELTAR/2.
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DLRSQ = DELTAR**2
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NP1 = N+1
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DELTHT = (D-C)/N
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DLTHSQ = DELTHT**2
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NP = NBDCND+1
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C
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C DEFINE RANGE OF INDICES I AND J FOR UNKNOWNS U(I,J).
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C
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MSTART = 2
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MSTOP = MP1
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GO TO (101,105,102,103,104,105),MBDCND
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101 MSTOP = M
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GO TO 105
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102 MSTART = 1
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GO TO 105
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103 MSTART = 1
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104 MSTOP = M
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105 MUNK = MSTOP-MSTART+1
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NSTART = 1
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NSTOP = N
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GO TO (109,106,107,108,109),NP
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106 NSTART = 2
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GO TO 109
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107 NSTART = 2
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108 NSTOP = NP1
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109 NUNK = NSTOP-NSTART+1
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C
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C DEFINE A,B,C COEFFICIENTS IN W-ARRAY.
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C
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ID2 = MUNK
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ID3 = ID2+MUNK
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ID4 = ID3+MUNK
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ID5 = ID4+MUNK
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ID6 = ID5+MUNK
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A1 = 2./DLRSQ
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IJ = 0
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IF (MBDCND.EQ.3 .OR. MBDCND.EQ.4) IJ = 1
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DO 110 I=1,MUNK
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R = A+(I-IJ)*DELTAR
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J = ID5+I
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W(J) = R
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J = ID6+I
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W(J) = 1./R**2
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W(I) = (R-DLRBY2)/(R*DLRSQ)
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J = ID3+I
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W(J) = (R+DLRBY2)/(R*DLRSQ)
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J = ID2+I
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W(J) = -A1+ELMBDA
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110 CONTINUE
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GO TO (114,111,112,113,114,111),MBDCND
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111 W(ID2) = A1
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GO TO 114
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112 W(ID2) = A1
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113 W(ID3+1) = A1
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114 CONTINUE
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C
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C ENTER BOUNDARY DATA FOR R-BOUNDARIES.
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C
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GO TO (115,115,117,117,119,119),MBDCND
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115 A1 = W(1)
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DO 116 J=NSTART,NSTOP
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F(2,J) = F(2,J)-A1*F(1,J)
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116 CONTINUE
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GO TO 119
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117 A1 = 2.*DELTAR*W(1)
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DO 118 J=NSTART,NSTOP
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F(1,J) = F(1,J)+A1*BDA(J)
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118 CONTINUE
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119 GO TO (120,122,122,120,120,122),MBDCND
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120 A1 = W(ID4)
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DO 121 J=NSTART,NSTOP
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F(M,J) = F(M,J)-A1*F(MP1,J)
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121 CONTINUE
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GO TO 124
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122 A1 = 2.*DELTAR*W(ID4)
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DO 123 J=NSTART,NSTOP
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F(MP1,J) = F(MP1,J)-A1*BDB(J)
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123 CONTINUE
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C
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C ENTER BOUNDARY DATA FOR THETA-BOUNDARIES.
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C
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124 A1 = 1./DLTHSQ
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L = ID5-MSTART+1
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LP = ID6-MSTART+1
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GO TO (134,125,125,127,127),NP
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125 DO 126 I=MSTART,MSTOP
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J = I+LP
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F(I,2) = F(I,2)-A1*W(J)*F(I,1)
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126 CONTINUE
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GO TO 129
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127 A1 = 2./DELTHT
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DO 128 I=MSTART,MSTOP
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J = I+LP
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F(I,1) = F(I,1)+A1*W(J)*BDC(I)
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128 CONTINUE
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129 A1 = 1./DLTHSQ
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GO TO (134,130,132,132,130),NP
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130 DO 131 I=MSTART,MSTOP
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J = I+LP
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F(I,N) = F(I,N)-A1*W(J)*F(I,NP1)
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131 CONTINUE
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GO TO 134
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132 A1 = 2./DELTHT
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DO 133 I=MSTART,MSTOP
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J = I+LP
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F(I,NP1) = F(I,NP1)-A1*W(J)*BDD(I)
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133 CONTINUE
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134 CONTINUE
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C
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C ADJUST RIGHT SIDE OF EQUATION FOR UNKNOWN AT POLE WHEN HAVE
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C DERIVATIVE SPECIFIED BOUNDARY CONDITIONS.
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C
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IF (MBDCND.GE.5 .AND. NBDCND.EQ.3)
|
|
1 F(1,1) = F(1,1)-(BDD(2)-BDC(2))*4./(N*DELTHT*DLRSQ)
|
|
C
|
|
C ADJUST RIGHT SIDE OF SINGULAR PROBLEMS TO INSURE EXISTENCE OF A
|
|
C SOLUTION.
|
|
C
|
|
PERTRB = 0.
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|
IF (ELMBDA) 144,136,135
|
|
135 IERROR = 11
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|
GO TO 144
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136 IF (NBDCND.NE.0 .AND. NBDCND.NE.3) GO TO 144
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|
S2 = 0.
|
|
GO TO (144,144,137,144,144,138),MBDCND
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137 W(ID5+1) = .5*(W(ID5+2)-DLRBY2)
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|
S2 = .25*DELTAR
|
|
138 A2 = 2.
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|
IF (NBDCND .EQ. 0) A2 = 1.
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|
J = ID5+MUNK
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|
W(J) = .5*(W(J-1)+DLRBY2)
|
|
S = 0.
|
|
DO 140 I=MSTART,MSTOP
|
|
S1 = 0.
|
|
IJ = NSTART+1
|
|
K = NSTOP-1
|
|
DO 139 J=IJ,K
|
|
S1 = S1+F(I,J)
|
|
139 CONTINUE
|
|
J = I+L
|
|
S = S+(A2*S1+F(I,NSTART)+F(I,NSTOP))*W(J)
|
|
140 CONTINUE
|
|
S2 = M*A+DELTAR*((M-1)*(M+1)*.5+.25)+S2
|
|
S1 = (2.+A2*(NUNK-2))*S2
|
|
IF (MBDCND .EQ. 3) GO TO 141
|
|
S2 = N*A2*DELTAR/8.
|
|
S = S+F(1,1)*S2
|
|
S1 = S1+S2
|
|
141 CONTINUE
|
|
PERTRB = S/S1
|
|
DO 143 I=MSTART,MSTOP
|
|
DO 142 J=NSTART,NSTOP
|
|
F(I,J) = F(I,J)-PERTRB
|
|
142 CONTINUE
|
|
143 CONTINUE
|
|
144 CONTINUE
|
|
C
|
|
C MULTIPLY I-TH EQUATION THROUGH BY (R(I)*DELTHT)**2.
|
|
C
|
|
DO 146 I=MSTART,MSTOP
|
|
K = I-MSTART+1
|
|
J = I+LP
|
|
A1 = DLTHSQ/W(J)
|
|
W(K) = A1*W(K)
|
|
J = ID2+K
|
|
W(J) = A1*W(J)
|
|
J = ID3+K
|
|
W(J) = A1*W(J)
|
|
DO 145 J=NSTART,NSTOP
|
|
F(I,J) = A1*F(I,J)
|
|
145 CONTINUE
|
|
146 CONTINUE
|
|
W(1) = 0.
|
|
W(ID4) = 0.
|
|
C
|
|
C CALL GENBUN TO SOLVE THE SYSTEM OF EQUATIONS.
|
|
C
|
|
CALL GENBUN (NBDCND,NUNK,1,MUNK,W(1),W(ID2+1),W(ID3+1),IDIMF,
|
|
1 F(MSTART,NSTART),IERR1,W(ID4+1))
|
|
IWSTOR = W(ID4+1)+3*MUNK
|
|
GO TO (157,157,157,157,148,147),MBDCND
|
|
C
|
|
C ADJUST THE SOLUTION AS NECESSARY FOR THE PROBLEMS WHERE A = 0.
|
|
C
|
|
147 IF (ELMBDA .NE. 0.) GO TO 148
|
|
YPOLE = 0.
|
|
GO TO 155
|
|
148 CONTINUE
|
|
J = ID5+MUNK
|
|
W(J) = W(ID2)/W(ID3)
|
|
DO 149 IP=3,MUNK
|
|
I = MUNK-IP+2
|
|
J = ID5+I
|
|
LP = ID2+I
|
|
K = ID3+I
|
|
W(J) = W(I)/(W(LP)-W(K)*W(J+1))
|
|
149 CONTINUE
|
|
W(ID5+1) = -.5*DLTHSQ/(W(ID2+1)-W(ID3+1)*W(ID5+2))
|
|
DO 150 I=2,MUNK
|
|
J = ID5+I
|
|
W(J) = -W(J)*W(J-1)
|
|
150 CONTINUE
|
|
S = 0.
|
|
DO 151 J=NSTART,NSTOP
|
|
S = S+F(2,J)
|
|
151 CONTINUE
|
|
A2 = NUNK
|
|
IF (NBDCND .EQ. 0) GO TO 152
|
|
S = S-.5*(F(2,NSTART)+F(2,NSTOP))
|
|
A2 = A2-1.
|
|
152 YPOLE = (.25*DLRSQ*F(1,1)-S/A2)/(W(ID5+1)-1.+ELMBDA*DLRSQ*.25)
|
|
DO 154 I=MSTART,MSTOP
|
|
K = L+I
|
|
DO 153 J=NSTART,NSTOP
|
|
F(I,J) = F(I,J)+YPOLE*W(K)
|
|
153 CONTINUE
|
|
154 CONTINUE
|
|
155 DO 156 J=1,NP1
|
|
F(1,J) = YPOLE
|
|
156 CONTINUE
|
|
157 CONTINUE
|
|
IF (NBDCND .NE. 0) GO TO 159
|
|
DO 158 I=MSTART,MSTOP
|
|
F(I,NP1) = F(I,1)
|
|
158 CONTINUE
|
|
159 CONTINUE
|
|
W(1) = IWSTOR
|
|
RETURN
|
|
END
|