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193 lines
8.3 KiB
Fortran
193 lines
8.3 KiB
Fortran
*DECK DQAG
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SUBROUTINE DQAG (F, A, B, EPSABS, EPSREL, KEY, RESULT, ABSERR,
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+ NEVAL, IER, LIMIT, LENW, LAST, IWORK, WORK)
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C***BEGIN PROLOGUE DQAG
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C***PURPOSE The routine calculates an approximation result to a given
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C definite integral I = integral of F over (A,B),
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C hopefully satisfying following claim for accuracy
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C ABS(I-RESULT)LE.MAX(EPSABS,EPSREL*ABS(I)).
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C***LIBRARY SLATEC (QUADPACK)
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C***CATEGORY H2A1A1
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C***TYPE DOUBLE PRECISION (QAG-S, DQAG-D)
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C***KEYWORDS AUTOMATIC INTEGRATOR, GAUSS-KRONROD RULES,
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C GENERAL-PURPOSE, GLOBALLY ADAPTIVE, INTEGRAND EXAMINATOR,
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C QUADPACK, QUADRATURE
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C***AUTHOR Piessens, Robert
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C Applied Mathematics and Programming Division
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C K. U. Leuven
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C de Doncker, Elise
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C Applied Mathematics and Programming Division
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C K. U. Leuven
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C***DESCRIPTION
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C
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C Computation of a definite integral
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C Standard fortran subroutine
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C Double precision version
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C
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C F - Double precision
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C Function subprogram defining the integrand
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C Function F(X). The actual name for F needs to be
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C Declared E X T E R N A L in the driver program.
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C
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C A - Double precision
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C Lower limit of integration
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C
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C B - Double precision
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C Upper limit of integration
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C
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C EPSABS - Double precision
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C Absolute accuracy requested
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C EPSREL - Double precision
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C Relative accuracy requested
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C If EPSABS.LE.0
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C And EPSREL.LT.MAX(50*REL.MACH.ACC.,0.5D-28),
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C The routine will end with IER = 6.
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C
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C KEY - Integer
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C Key for choice of local integration rule
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C A GAUSS-KRONROD PAIR is used with
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C 7 - 15 POINTS If KEY.LT.2,
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C 10 - 21 POINTS If KEY = 2,
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C 15 - 31 POINTS If KEY = 3,
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C 20 - 41 POINTS If KEY = 4,
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C 25 - 51 POINTS If KEY = 5,
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C 30 - 61 POINTS If KEY.GT.5.
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C
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C ON RETURN
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C RESULT - Double precision
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C Approximation to the integral
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C
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C ABSERR - Double precision
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C Estimate of the modulus of the absolute error,
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C Which should EQUAL or EXCEED ABS(I-RESULT)
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C
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C NEVAL - Integer
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C Number of integrand evaluations
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C
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C IER - Integer
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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 IER.GT.0 Abnormal termination of the routine
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C The estimates for RESULT and ERROR are
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C Less reliable. It is assumed that the
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C requested accuracy has not been achieved.
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C ERROR MESSAGES
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C IER = 1 Maximum number of subdivisions allowed
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C has been achieved. One can allow more
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C subdivisions by increasing the value of
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C LIMIT (and taking the according dimension
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C adjustments into account). HOWEVER, If
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C this yield no improvement it is advised
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C to analyze the integrand in order to
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C determine the integration difficulties.
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C If the position of a local difficulty can
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C be determined (I.E. SINGULARITY,
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C DISCONTINUITY WITHIN THE INTERVAL) One
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C will probably gain from splitting up the
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C interval at this point and calling the
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C INTEGRATOR on the SUBRANGES. If possible,
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C AN APPROPRIATE SPECIAL-PURPOSE INTEGRATOR
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C should be used which is designed for
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C handling the type of difficulty involved.
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C = 2 The occurrence of roundoff error is
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C detected, which prevents the requested
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C tolerance from being achieved.
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C = 3 Extremely bad integrand behaviour occurs
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C at some points of the integration
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C interval.
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C = 6 The input is invalid, because
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C (EPSABS.LE.0 AND
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C EPSREL.LT.MAX(50*REL.MACH.ACC.,0.5D-28))
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C OR LIMIT.LT.1 OR LENW.LT.LIMIT*4.
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C RESULT, ABSERR, NEVAL, LAST are set
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C to zero.
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C EXCEPT when LENW is invalid, IWORK(1),
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C WORK(LIMIT*2+1) and WORK(LIMIT*3+1) are
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C set to zero, WORK(1) is set to A and
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C WORK(LIMIT+1) to B.
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C
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C DIMENSIONING PARAMETERS
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C LIMIT - Integer
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C Dimensioning parameter for IWORK
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C Limit determines the maximum number of subintervals
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C in the partition of the given integration interval
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C (A,B), LIMIT.GE.1.
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C If LIMIT.LT.1, the routine will end with IER = 6.
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C
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C LENW - Integer
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C Dimensioning parameter for work
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C LENW must be at least LIMIT*4.
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C IF LENW.LT.LIMIT*4, the routine will end with
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C IER = 6.
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C
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C LAST - Integer
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C On return, LAST equals the number of subintervals
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C produced in the subdivision process, which
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C determines the number of significant elements
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C actually in the WORK ARRAYS.
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C
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C WORK ARRAYS
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C IWORK - Integer
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C Vector of dimension at least limit, the first K
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C elements of which contain pointers to the error
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C estimates over the subintervals, such that
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C WORK(LIMIT*3+IWORK(1)),... , WORK(LIMIT*3+IWORK(K))
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C form a decreasing sequence with K = LAST If
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C LAST.LE.(LIMIT/2+2), and K = LIMIT+1-LAST otherwise
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C
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C WORK - Double precision
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C Vector of dimension at least LENW
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C on return
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C WORK(1), ..., WORK(LAST) contain the left end
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C points of the subintervals in the partition of
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C (A,B),
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C WORK(LIMIT+1), ..., WORK(LIMIT+LAST) contain the
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C right end points,
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C WORK(LIMIT*2+1), ..., WORK(LIMIT*2+LAST) contain
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C the integral approximations over the subintervals,
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C WORK(LIMIT*3+1), ..., WORK(LIMIT*3+LAST) contain
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C the error estimates.
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C
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C***REFERENCES (NONE)
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C***ROUTINES CALLED DQAGE, XERMSG
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C***REVISION HISTORY (YYMMDD)
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C 800101 DATE WRITTEN
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C 890831 Modified array declarations. (WRB)
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C 890831 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***END PROLOGUE DQAG
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DOUBLE PRECISION A,ABSERR,B,EPSABS,EPSREL,F,RESULT,WORK
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INTEGER IER,IWORK,KEY,LAST,LENW,LIMIT,LVL,L1,L2,L3,NEVAL
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C
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DIMENSION IWORK(*),WORK(*)
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C
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EXTERNAL F
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C***FIRST EXECUTABLE STATEMENT DQAG
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IER = 6
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NEVAL = 0
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LAST = 0
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RESULT = 0.0D+00
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ABSERR = 0.0D+00
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IF (LIMIT.GE.1 .AND. LENW.GE.LIMIT*4) THEN
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C
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C PREPARE CALL FOR DQAGE.
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C
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L1 = LIMIT+1
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L2 = LIMIT+L1
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L3 = LIMIT+L2
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C
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CALL DQAGE(F,A,B,EPSABS,EPSREL,KEY,LIMIT,RESULT,ABSERR,NEVAL,
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1 IER,WORK(1),WORK(L1),WORK(L2),WORK(L3),IWORK,LAST)
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C
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C CALL ERROR HANDLER IF NECESSARY.
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C
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LVL = 0
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ENDIF
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C
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IF (IER.EQ.6) LVL = 1
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IF (IER .NE. 0) CALL XERMSG ('SLATEC', 'DQAG',
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+ 'ABNORMAL RETURN', IER, LVL)
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RETURN
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END
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