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411 lines
13 KiB
Fortran
411 lines
13 KiB
Fortran
*DECK DRD
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DOUBLE PRECISION FUNCTION DRD (X, Y, Z, IER)
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C***BEGIN PROLOGUE DRD
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C***PURPOSE Compute the incomplete or complete elliptic integral of
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C the 2nd kind. For X and Y nonnegative, X+Y and Z positive,
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C DRD(X,Y,Z) = Integral from zero to infinity of
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C -1/2 -1/2 -3/2
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C (3/2)(t+X) (t+Y) (t+Z) dt.
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C If X or Y is zero, the integral is complete.
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C***LIBRARY SLATEC
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C***CATEGORY C14
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C***TYPE DOUBLE PRECISION (RD-S, DRD-D)
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C***KEYWORDS COMPLETE ELLIPTIC INTEGRAL, DUPLICATION THEOREM,
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C INCOMPLETE ELLIPTIC INTEGRAL, INTEGRAL OF THE SECOND KIND,
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C TAYLOR SERIES
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C***AUTHOR Carlson, B. C.
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C Ames Laboratory-DOE
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C Iowa State University
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C Ames, IA 50011
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C Notis, E. M.
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C Ames Laboratory-DOE
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C Iowa State University
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C Ames, IA 50011
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C Pexton, R. L.
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C Lawrence Livermore National Laboratory
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C Livermore, CA 94550
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C***DESCRIPTION
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C
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C 1. DRD
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C Evaluate an INCOMPLETE (or COMPLETE) ELLIPTIC INTEGRAL
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C of the second kind
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C Standard FORTRAN function routine
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C Double precision version
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C The routine calculates an approximation result to
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C DRD(X,Y,Z) = Integral from zero to infinity of
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C -1/2 -1/2 -3/2
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C (3/2)(t+X) (t+Y) (t+Z) dt,
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C where X and Y are nonnegative, X + Y is positive, and Z is
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C positive. If X or Y is zero, the integral is COMPLETE.
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C The duplication theorem is iterated until the variables are
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C nearly equal, and the function is then expanded in Taylor
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C series to fifth order.
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C
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C 2. Calling Sequence
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C
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C DRD( X, Y, Z, IER )
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C
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C Parameters On Entry
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C Values assigned by the calling routine
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C
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C X - Double precision, nonnegative variable
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C
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C Y - Double precision, nonnegative variable
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C
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C X + Y is positive
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C
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C Z - Double precision, positive variable
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C
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C
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C
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C On Return (values assigned by the DRD routine)
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C
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C DRD - Double precision approximation to the integral
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C
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C
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C IER - Integer
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C
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C IER = 0 Normal and reliable termination of the
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C routine. It is assumed that the requested
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C accuracy has been achieved.
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C
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C IER > 0 Abnormal termination of the routine
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C
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C
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C X, Y, Z are unaltered.
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C
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C 3. Error Messages
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C
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C Value of IER assigned by the DRD routine
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C
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C Value assigned Error message printed
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C IER = 1 MIN(X,Y) .LT. 0.0D0
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C = 2 MIN(X + Y, Z ) .LT. LOLIM
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C = 3 MAX(X,Y,Z) .GT. UPLIM
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C
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C
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C 4. Control Parameters
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C
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C Values of LOLIM, UPLIM, and ERRTOL are set by the
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C routine.
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C
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C LOLIM and UPLIM determine the valid range of X, Y, and Z
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C
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C LOLIM - Lower limit of valid arguments
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C
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C Not less than 2 / (machine maximum) ** (2/3).
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C
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C UPLIM - Upper limit of valid arguments
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C
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C Not greater than (0.1D0 * ERRTOL / machine
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C minimum) ** (2/3), where ERRTOL is described below.
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C In the following table it is assumed that ERRTOL will
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C never be chosen smaller than 1.0D-5.
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C
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C
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C Acceptable values for: LOLIM UPLIM
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C IBM 360/370 SERIES : 6.0D-51 1.0D+48
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C CDC 6000/7000 SERIES : 5.0D-215 2.0D+191
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C UNIVAC 1100 SERIES : 1.0D-205 2.0D+201
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C CRAY : 3.0D-1644 1.69D+1640
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C VAX 11 SERIES : 1.0D-25 4.5D+21
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C
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C
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C ERRTOL determines the accuracy of the answer
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C
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C The value assigned by the routine will result
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C in solution precision within 1-2 decimals of
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C "machine precision".
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C
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C ERRTOL Relative error due to truncation is less than
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C 3 * ERRTOL ** 6 / (1-ERRTOL) ** 3/2.
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C
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C
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C
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C The accuracy of the computed approximation to the integral
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C can be controlled by choosing the value of ERRTOL.
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C Truncation of a Taylor series after terms of fifth order
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C introduces an error less than the amount shown in the
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C second column of the following table for each value of
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C ERRTOL in the first column. In addition to the truncation
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C error there will be round-off error, but in practice the
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C total error from both sources is usually less than the
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C amount given in the table.
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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 Sample choices: ERRTOL Relative truncation
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C error less than
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C 1.0D-3 4.0D-18
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C 3.0D-3 3.0D-15
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C 1.0D-2 4.0D-12
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C 3.0D-2 3.0D-9
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C 1.0D-1 4.0D-6
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C
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C
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C Decreasing ERRTOL by a factor of 10 yields six more
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C decimal digits of accuracy at the expense of one or
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C two more iterations of the duplication theorem.
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C
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C *Long Description:
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C
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C DRD Special Comments
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C
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C
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C
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C Check: DRD(X,Y,Z) + DRD(Y,Z,X) + DRD(Z,X,Y)
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C = 3 / SQRT(X * Y * Z), where X, Y, and Z are positive.
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C
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C
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C On Input:
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C
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C X, Y, and Z are the variables in the integral DRD(X,Y,Z).
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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
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C X, Y, Z are unaltered.
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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
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C WARNING: Changes in the program may improve speed at the
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C expense of robustness.
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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
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C
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C Special double precision functions via DRD and DRF
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C
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C
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C Legendre form of ELLIPTIC INTEGRAL of 2nd kind
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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 2 2 2
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C E(PHI,K) = SIN(PHI) DRF(COS (PHI),1-K SIN (PHI),1) -
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C
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C 2 3 2 2 2
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C -(K/3) SIN (PHI) DRD(COS (PHI),1-K SIN (PHI),1)
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C
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C
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C 2 2 2
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C E(K) = DRF(0,1-K ,1) - (K/3) DRD(0,1-K ,1)
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C
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C PI/2 2 2 1/2
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C = INT (1-K SIN (PHI) ) D PHI
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C 0
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C
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C Bulirsch form of ELLIPTIC INTEGRAL of 2nd kind
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C
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C -----------------------------------------
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C
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C 2 2 2
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C EL2(X,KC,A,B) = AX DRF(1,1+KC X ,1+X ) +
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C
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C 3 2 2 2
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C +(1/3)(B-A) X DRD(1,1+KC X ,1+X )
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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 Legendre form of alternative ELLIPTIC INTEGRAL
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C of 2nd kind
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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
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C Q 2 2 2 -1/2
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C D(Q,K) = INT SIN P (1-K SIN P) DP
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C 0
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C
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C
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C
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C 3 2 2 2
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C D(Q,K) = (1/3) (SIN Q) DRD(COS Q,1-K SIN Q,1)
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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 Lemniscate constant B
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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
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C
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C 1 2 4 -1/2
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C B = INT S (1-S ) DS
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C 0
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C
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C
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C B = (1/3) DRD (0,2,1)
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C
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C
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C Heuman's LAMBDA function
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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
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C (PI/2) LAMBDA0(A,B) =
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C
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C 2 2
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C = SIN(B) (DRF(0,COS (A),1)-(1/3) SIN (A) *
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C
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C 2 2 2 2
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C *DRD(0,COS (A),1)) DRF(COS (B),1-COS (A) SIN (B),1)
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C
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C 2 3 2
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C -(1/3) COS (A) SIN (B) DRF(0,COS (A),1) *
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C
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C 2 2 2
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C *DRD(COS (B),1-COS (A) SIN (B),1)
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C
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C
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C
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C Jacobi ZETA function
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C
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C -----------------------------------------
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C
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C 2 2 2 2
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C Z(B,K) = (K/3) SIN(B) DRF(COS (B),1-K SIN (B),1)
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C
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C
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C 2 2
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C *DRD(0,1-K ,1)/DRF(0,1-K ,1)
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C
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C 2 3 2 2 2
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C -(K /3) SIN (B) DRD(COS (B),1-K SIN (B),1)
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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***REFERENCES B. C. Carlson and E. M. Notis, Algorithms for incomplete
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C elliptic integrals, ACM Transactions on Mathematical
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C Software 7, 3 (September 1981), pp. 398-403.
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C B. C. Carlson, Computing elliptic integrals by
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C duplication, Numerische Mathematik 33, (1979),
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C pp. 1-16.
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C B. C. Carlson, Elliptic integrals of the first kind,
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C SIAM Journal of Mathematical Analysis 8, (1977),
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C pp. 231-242.
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C***ROUTINES CALLED D1MACH, XERMSG
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C***REVISION HISTORY (YYMMDD)
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C 790801 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 900315 CALLs to XERROR changed to CALLs to XERMSG. (THJ)
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C 900326 Removed duplicate information from DESCRIPTION section.
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C (WRB)
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C 900510 Modify calls to XERMSG to put in standard form. (RWC)
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C 920501 Reformatted the REFERENCES section. (WRB)
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C***END PROLOGUE DRD
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CHARACTER*16 XERN3, XERN4, XERN5, XERN6
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INTEGER IER
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DOUBLE PRECISION LOLIM, TUPLIM, UPLIM, EPSLON, ERRTOL, D1MACH
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DOUBLE PRECISION C1, C2, C3, C4, EA, EB, EC, ED, EF, LAMDA
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DOUBLE PRECISION MU, POWER4, SIGMA, S1, S2, X, XN, XNDEV
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DOUBLE PRECISION XNROOT, Y, YN, YNDEV, YNROOT, Z, ZN, ZNDEV,
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* ZNROOT
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LOGICAL FIRST
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SAVE ERRTOL, LOLIM, UPLIM, C1, C2, C3, C4, FIRST
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DATA FIRST /.TRUE./
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C
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C***FIRST EXECUTABLE STATEMENT DRD
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IF (FIRST) THEN
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ERRTOL = (D1MACH(3)/3.0D0)**(1.0D0/6.0D0)
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LOLIM = 2.0D0/(D1MACH(2))**(2.0D0/3.0D0)
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TUPLIM = D1MACH(1)**(1.0E0/3.0E0)
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TUPLIM = (0.10D0*ERRTOL)**(1.0E0/3.0E0)/TUPLIM
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UPLIM = TUPLIM**2.0D0
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C
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C1 = 3.0D0/14.0D0
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C2 = 1.0D0/6.0D0
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C3 = 9.0D0/22.0D0
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C4 = 3.0D0/26.0D0
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ENDIF
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FIRST = .FALSE.
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C
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C CALL ERROR HANDLER IF NECESSARY.
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C
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DRD = 0.0D0
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IF( MIN(X,Y).LT.0.0D0) THEN
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IER = 1
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WRITE (XERN3, '(1PE15.6)') X
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WRITE (XERN4, '(1PE15.6)') Y
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CALL XERMSG ('SLATEC', 'DRD',
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* 'MIN(X,Y).LT.0 WHERE X = ' // XERN3 // ' AND Y = ' //
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* XERN4, 1, 1)
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RETURN
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ENDIF
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C
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IF (MAX(X,Y,Z).GT.UPLIM) THEN
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IER = 3
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WRITE (XERN3, '(1PE15.6)') X
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WRITE (XERN4, '(1PE15.6)') Y
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WRITE (XERN5, '(1PE15.6)') Z
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WRITE (XERN6, '(1PE15.6)') UPLIM
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CALL XERMSG ('SLATEC', 'DRD',
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* 'MAX(X,Y,Z).GT.UPLIM WHERE X = ' // XERN3 // ' Y = ' //
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* XERN4 // ' Z = ' // XERN5 // ' AND UPLIM = ' // XERN6,
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* 3, 1)
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RETURN
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ENDIF
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C
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IF (MIN(X+Y,Z).LT.LOLIM) THEN
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IER = 2
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WRITE (XERN3, '(1PE15.6)') X
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WRITE (XERN4, '(1PE15.6)') Y
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WRITE (XERN5, '(1PE15.6)') Z
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WRITE (XERN6, '(1PE15.6)') LOLIM
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CALL XERMSG ('SLATEC', 'DRD',
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* 'MIN(X+Y,Z).LT.LOLIM WHERE X = ' // XERN3 // ' Y = ' //
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* XERN4 // ' Z = ' // XERN5 // ' AND LOLIM = ' // XERN6,
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* 2, 1)
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RETURN
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ENDIF
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C
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IER = 0
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XN = X
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YN = Y
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ZN = Z
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SIGMA = 0.0D0
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POWER4 = 1.0D0
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C
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30 MU = (XN+YN+3.0D0*ZN)*0.20D0
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XNDEV = (MU-XN)/MU
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YNDEV = (MU-YN)/MU
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ZNDEV = (MU-ZN)/MU
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EPSLON = MAX(ABS(XNDEV), ABS(YNDEV), ABS(ZNDEV))
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IF (EPSLON.LT.ERRTOL) GO TO 40
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XNROOT = SQRT(XN)
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YNROOT = SQRT(YN)
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ZNROOT = SQRT(ZN)
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LAMDA = XNROOT*(YNROOT+ZNROOT) + YNROOT*ZNROOT
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SIGMA = SIGMA + POWER4/(ZNROOT*(ZN+LAMDA))
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POWER4 = POWER4*0.250D0
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XN = (XN+LAMDA)*0.250D0
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YN = (YN+LAMDA)*0.250D0
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ZN = (ZN+LAMDA)*0.250D0
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GO TO 30
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C
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40 EA = XNDEV*YNDEV
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EB = ZNDEV*ZNDEV
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EC = EA - EB
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ED = EA - 6.0D0*EB
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EF = ED + EC + EC
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S1 = ED*(-C1+0.250D0*C3*ED-1.50D0*C4*ZNDEV*EF)
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S2 = ZNDEV*(C2*EF+ZNDEV*(-C3*EC+ZNDEV*C4*EA))
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DRD = 3.0D0*SIGMA + POWER4*(1.0D0+S1+S2)/(MU*SQRT(MU))
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C
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RETURN
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END
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