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202 lines
7.8 KiB
Fortran
202 lines
7.8 KiB
Fortran
*DECK QK51
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SUBROUTINE QK51 (F, A, B, RESULT, ABSERR, RESABS, RESASC)
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C***BEGIN PROLOGUE QK51
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C***PURPOSE To compute I = Integral of F over (A,B) with error
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C estimate
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C J = Integral of ABS(F) over (A,B)
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C***LIBRARY SLATEC (QUADPACK)
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C***CATEGORY H2A1A2
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C***TYPE SINGLE PRECISION (QK51-S, DQK51-D)
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C***KEYWORDS 51-POINT GAUSS-KRONROD RULES, 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 Integration rules
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C Standard fortran subroutine
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C Real version
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C
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C PARAMETERS
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C ON ENTRY
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C F - Real
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C Function subroutine 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 calling program.
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C
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C A - Real
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C Lower limit of integration
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C
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C B - Real
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C Upper limit of integration
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C
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C ON RETURN
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C RESULT - Real
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C Approximation to the integral I
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C RESULT is computed by applying the 51-point
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C Kronrod rule (RESK) obtained by optimal addition
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C of abscissae to the 25-point Gauss rule (RESG).
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C
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C ABSERR - Real
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C Estimate of the modulus of the absolute error,
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C which should not exceed ABS(I-RESULT)
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C
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C RESABS - Real
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C Approximation to the integral J
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C
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C RESASC - Real
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C Approximation to the integral of ABS(F-I/(B-A))
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C over (A,B)
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C
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C***REFERENCES (NONE)
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C***ROUTINES CALLED R1MACH
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C***REVISION HISTORY (YYMMDD)
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C 800101 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***END PROLOGUE QK51
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C
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REAL A,ABSC,ABSERR,B,CENTR,DHLGTH,EPMACH,F,FC,FSUM,FVAL1,FVAL2,
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1 FV1,FV2,HLGTH,RESABS,RESASC,RESG,RESK,RESKH,RESULT,R1MACH,UFLOW,
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2 WG,WGK,XGK
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INTEGER J,JTW,JTWM1
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EXTERNAL F
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C
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DIMENSION FV1(25),FV2(25),XGK(26),WGK(26),WG(13)
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C
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C THE ABSCISSAE AND WEIGHTS ARE GIVEN FOR THE INTERVAL (-1,1).
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C BECAUSE OF SYMMETRY ONLY THE POSITIVE ABSCISSAE AND THEIR
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C CORRESPONDING WEIGHTS ARE GIVEN.
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C
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C XGK - ABSCISSAE OF THE 51-POINT KRONROD RULE
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C XGK(2), XGK(4), ... ABSCISSAE OF THE 25-POINT
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C GAUSS RULE
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C XGK(1), XGK(3), ... ABSCISSAE WHICH ARE OPTIMALLY
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C ADDED TO THE 25-POINT GAUSS RULE
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C
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C WGK - WEIGHTS OF THE 51-POINT KRONROD RULE
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C
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C WG - WEIGHTS OF THE 25-POINT GAUSS RULE
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C
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SAVE XGK, WGK, WG
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DATA XGK(1),XGK(2),XGK(3),XGK(4),XGK(5),XGK(6),XGK(7),XGK(8),
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1 XGK(9),XGK(10),XGK(11),XGK(12),XGK(13),XGK(14)/
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2 0.9992621049926098E+00, 0.9955569697904981E+00,
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3 0.9880357945340772E+00, 0.9766639214595175E+00,
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4 0.9616149864258425E+00, 0.9429745712289743E+00,
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5 0.9207471152817016E+00, 0.8949919978782754E+00,
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6 0.8658470652932756E+00, 0.8334426287608340E+00,
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7 0.7978737979985001E+00, 0.7592592630373576E+00,
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8 0.7177664068130844E+00, 0.6735663684734684E+00/
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DATA XGK(15),XGK(16),XGK(17),XGK(18),XGK(19),XGK(20),XGK(21),
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1 XGK(22),XGK(23),XGK(24),XGK(25),XGK(26)/
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2 0.6268100990103174E+00, 0.5776629302412230E+00,
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3 0.5263252843347192E+00, 0.4730027314457150E+00,
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4 0.4178853821930377E+00, 0.3611723058093878E+00,
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5 0.3030895389311078E+00, 0.2438668837209884E+00,
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6 0.1837189394210489E+00, 0.1228646926107104E+00,
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7 0.6154448300568508E-01, 0.0E+00 /
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DATA WGK(1),WGK(2),WGK(3),WGK(4),WGK(5),WGK(6),WGK(7),WGK(8),
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1 WGK(9),WGK(10),WGK(11),WGK(12),WGK(13),WGK(14)/
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2 0.1987383892330316E-02, 0.5561932135356714E-02,
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3 0.9473973386174152E-02, 0.1323622919557167E-01,
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4 0.1684781770912830E-01, 0.2043537114588284E-01,
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5 0.2400994560695322E-01, 0.2747531758785174E-01,
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6 0.3079230016738749E-01, 0.3400213027432934E-01,
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7 0.3711627148341554E-01, 0.4008382550403238E-01,
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8 0.4287284502017005E-01, 0.4550291304992179E-01/
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DATA WGK(15),WGK(16),WGK(17),WGK(18),WGK(19),WGK(20),WGK(21)
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1 ,WGK(22),WGK(23),WGK(24),WGK(25),WGK(26)/
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2 0.4798253713883671E-01, 0.5027767908071567E-01,
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3 0.5236288580640748E-01, 0.5425112988854549E-01,
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4 0.5595081122041232E-01, 0.5743711636156783E-01,
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5 0.5868968002239421E-01, 0.5972034032417406E-01,
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6 0.6053945537604586E-01, 0.6112850971705305E-01,
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7 0.6147118987142532E-01, 0.6158081806783294E-01/
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DATA WG(1),WG(2),WG(3),WG(4),WG(5),WG(6),WG(7),WG(8),WG(9),
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1 WG(10),WG(11),WG(12),WG(13)/
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2 0.1139379850102629E-01, 0.2635498661503214E-01,
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3 0.4093915670130631E-01, 0.5490469597583519E-01,
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4 0.6803833381235692E-01, 0.8014070033500102E-01,
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5 0.9102826198296365E-01, 0.1005359490670506E+00,
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6 0.1085196244742637E+00, 0.1148582591457116E+00,
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7 0.1194557635357848E+00, 0.1222424429903100E+00,
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8 0.1231760537267155E+00/
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C
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C
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C LIST OF MAJOR VARIABLES
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C -----------------------
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C
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C CENTR - MID POINT OF THE INTERVAL
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C HLGTH - HALF-LENGTH OF THE INTERVAL
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C ABSC - ABSCISSA
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C FVAL* - FUNCTION VALUE
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C RESG - RESULT OF THE 25-POINT GAUSS FORMULA
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C RESK - RESULT OF THE 51-POINT KRONROD FORMULA
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C RESKH - APPROXIMATION TO THE MEAN VALUE OF F OVER (A,B),
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C I.E. TO I/(B-A)
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C
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C MACHINE DEPENDENT CONSTANTS
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C ---------------------------
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C
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C EPMACH IS THE LARGEST RELATIVE SPACING.
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C UFLOW IS THE SMALLEST POSITIVE MAGNITUDE.
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C
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C***FIRST EXECUTABLE STATEMENT QK51
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EPMACH = R1MACH(4)
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UFLOW = R1MACH(1)
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C
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CENTR = 0.5E+00*(A+B)
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HLGTH = 0.5E+00*(B-A)
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DHLGTH = ABS(HLGTH)
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C
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C COMPUTE THE 51-POINT KRONROD APPROXIMATION TO
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C THE INTEGRAL, AND ESTIMATE THE ABSOLUTE ERROR.
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C
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FC = F(CENTR)
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RESG = WG(13)*FC
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RESK = WGK(26)*FC
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RESABS = ABS(RESK)
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DO 10 J=1,12
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JTW = J*2
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ABSC = HLGTH*XGK(JTW)
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FVAL1 = F(CENTR-ABSC)
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FVAL2 = F(CENTR+ABSC)
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FV1(JTW) = FVAL1
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FV2(JTW) = FVAL2
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FSUM = FVAL1+FVAL2
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RESG = RESG+WG(J)*FSUM
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RESK = RESK+WGK(JTW)*FSUM
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RESABS = RESABS+WGK(JTW)*(ABS(FVAL1)+ABS(FVAL2))
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10 CONTINUE
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DO 15 J = 1,13
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JTWM1 = J*2-1
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ABSC = HLGTH*XGK(JTWM1)
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FVAL1 = F(CENTR-ABSC)
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FVAL2 = F(CENTR+ABSC)
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FV1(JTWM1) = FVAL1
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FV2(JTWM1) = FVAL2
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FSUM = FVAL1+FVAL2
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RESK = RESK+WGK(JTWM1)*FSUM
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RESABS = RESABS+WGK(JTWM1)*(ABS(FVAL1)+ABS(FVAL2))
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15 CONTINUE
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RESKH = RESK*0.5E+00
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RESASC = WGK(26)*ABS(FC-RESKH)
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DO 20 J=1,25
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RESASC = RESASC+WGK(J)*(ABS(FV1(J)-RESKH)+ABS(FV2(J)-RESKH))
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20 CONTINUE
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RESULT = RESK*HLGTH
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RESABS = RESABS*DHLGTH
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RESASC = RESASC*DHLGTH
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ABSERR = ABS((RESK-RESG)*HLGTH)
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IF(RESASC.NE.0.0E+00.AND.ABSERR.NE.0.0E+00)
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1 ABSERR = RESASC*MIN(0.1E+01,
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2 (0.2E+03*ABSERR/RESASC)**1.5E+00)
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IF(RESABS.GT.UFLOW/(0.5E+02*EPMACH)) ABSERR = MAX
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1 ((EPMACH*0.5E+02)*RESABS,ABSERR)
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RETURN
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END
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