*DECK DQK15W SUBROUTINE DQK15W (F, W, P1, P2, P3, P4, KP, A, B, RESULT, ABSERR, + RESABS, RESASC) C***BEGIN PROLOGUE DQK15W C***PURPOSE To compute I = Integral of F*W over (A,B), with error C estimate C J = Integral of ABS(F*W) over (A,B) C***LIBRARY SLATEC (QUADPACK) C***CATEGORY H2A2A2 C***TYPE DOUBLE PRECISION (QK15W-S, DQK15W-D) C***KEYWORDS 15-POINT GAUSS-KRONROD RULES, QUADPACK, QUADRATURE C***AUTHOR Piessens, Robert C Applied Mathematics and Programming Division C K. U. Leuven C de Doncker, Elise C Applied Mathematics and Programming Division C K. U. Leuven C***DESCRIPTION C C Integration rules C Standard fortran subroutine C Double precision version C C PARAMETERS C ON ENTRY C F - Double precision C Function subprogram defining the integrand C function F(X). The actual name for F needs to be C declared E X T E R N A L in the driver program. C C W - Double precision C Function subprogram defining the integrand C WEIGHT function W(X). The actual name for W C needs to be declared E X T E R N A L in the C calling program. C C P1, P2, P3, P4 - Double precision C Parameters in the WEIGHT function C C KP - Integer C Key for indicating the type of WEIGHT function C C A - Double precision C Lower limit of integration C C B - Double precision C Upper limit of integration C C ON RETURN C RESULT - Double precision C Approximation to the integral I C RESULT is computed by applying the 15-point C Kronrod rule (RESK) obtained by optimal addition C of abscissae to the 7-point Gauss rule (RESG). C C ABSERR - Double precision C Estimate of the modulus of the absolute error, C which should equal or exceed ABS(I-RESULT) C C RESABS - Double precision C Approximation to the integral of ABS(F) C C RESASC - Double precision C Approximation to the integral of ABS(F-I/(B-A)) C C***REFERENCES (NONE) C***ROUTINES CALLED D1MACH C***REVISION HISTORY (YYMMDD) C 810101 DATE WRITTEN C 890531 Changed all specific intrinsics to generic. (WRB) C 890531 REVISION DATE from Version 3.2 C 891214 Prologue converted to Version 4.0 format. (BAB) C***END PROLOGUE DQK15W C DOUBLE PRECISION A,ABSC,ABSC1,ABSC2,ABSERR,B,CENTR,DHLGTH, 1 D1MACH,EPMACH,F,FC,FSUM,FVAL1,FVAL2,FV1,FV2,HLGTH, 2 P1,P2,P3,P4,RESABS,RESASC,RESG,RESK,RESKH,RESULT,UFLOW,W,WG,WGK, 3 XGK INTEGER J,JTW,JTWM1,KP EXTERNAL F, W C DIMENSION FV1(7),FV2(7),XGK(8),WGK(8),WG(4) C C THE ABSCISSAE AND WEIGHTS ARE GIVEN FOR THE INTERVAL (-1,1). C BECAUSE OF SYMMETRY ONLY THE POSITIVE ABSCISSAE AND THEIR C CORRESPONDING WEIGHTS ARE GIVEN. C C XGK - ABSCISSAE OF THE 15-POINT GAUSS-KRONROD RULE C XGK(2), XGK(4), ... ABSCISSAE OF THE 7-POINT C GAUSS RULE C XGK(1), XGK(3), ... ABSCISSAE WHICH ARE OPTIMALLY C ADDED TO THE 7-POINT GAUSS RULE C C WGK - WEIGHTS OF THE 15-POINT GAUSS-KRONROD RULE C C WG - WEIGHTS OF THE 7-POINT GAUSS RULE C SAVE XGK, WGK, WG DATA XGK(1),XGK(2),XGK(3),XGK(4),XGK(5),XGK(6),XGK(7),XGK(8)/ 1 0.9914553711208126D+00, 0.9491079123427585D+00, 2 0.8648644233597691D+00, 0.7415311855993944D+00, 3 0.5860872354676911D+00, 0.4058451513773972D+00, 4 0.2077849550078985D+00, 0.0000000000000000D+00/ C DATA WGK(1),WGK(2),WGK(3),WGK(4),WGK(5),WGK(6),WGK(7),WGK(8)/ 1 0.2293532201052922D-01, 0.6309209262997855D-01, 2 0.1047900103222502D+00, 0.1406532597155259D+00, 3 0.1690047266392679D+00, 0.1903505780647854D+00, 4 0.2044329400752989D+00, 0.2094821410847278D+00/ C DATA WG(1),WG(2),WG(3),WG(4)/ 1 0.1294849661688697D+00, 0.2797053914892767D+00, 2 0.3818300505051189D+00, 0.4179591836734694D+00/ C C C LIST OF MAJOR VARIABLES C ----------------------- C C CENTR - MID POINT OF THE INTERVAL C HLGTH - HALF-LENGTH OF THE INTERVAL C ABSC* - ABSCISSA C FVAL* - FUNCTION VALUE C RESG - RESULT OF THE 7-POINT GAUSS FORMULA C RESK - RESULT OF THE 15-POINT KRONROD FORMULA C RESKH - APPROXIMATION TO THE MEAN VALUE OF F*W OVER (A,B), C I.E. TO I/(B-A) C C MACHINE DEPENDENT CONSTANTS C --------------------------- C C EPMACH IS THE LARGEST RELATIVE SPACING. C UFLOW IS THE SMALLEST POSITIVE MAGNITUDE. C C***FIRST EXECUTABLE STATEMENT DQK15W EPMACH = D1MACH(4) UFLOW = D1MACH(1) C CENTR = 0.5D+00*(A+B) HLGTH = 0.5D+00*(B-A) DHLGTH = ABS(HLGTH) C C COMPUTE THE 15-POINT KRONROD APPROXIMATION TO THE C INTEGRAL, AND ESTIMATE THE ERROR. C FC = F(CENTR)*W(CENTR,P1,P2,P3,P4,KP) RESG = WG(4)*FC RESK = WGK(8)*FC RESABS = ABS(RESK) DO 10 J=1,3 JTW = J*2 ABSC = HLGTH*XGK(JTW) ABSC1 = CENTR-ABSC ABSC2 = CENTR+ABSC FVAL1 = F(ABSC1)*W(ABSC1,P1,P2,P3,P4,KP) FVAL2 = F(ABSC2)*W(ABSC2,P1,P2,P3,P4,KP) FV1(JTW) = FVAL1 FV2(JTW) = FVAL2 FSUM = FVAL1+FVAL2 RESG = RESG+WG(J)*FSUM RESK = RESK+WGK(JTW)*FSUM RESABS = RESABS+WGK(JTW)*(ABS(FVAL1)+ABS(FVAL2)) 10 CONTINUE DO 15 J=1,4 JTWM1 = J*2-1 ABSC = HLGTH*XGK(JTWM1) ABSC1 = CENTR-ABSC ABSC2 = CENTR+ABSC FVAL1 = F(ABSC1)*W(ABSC1,P1,P2,P3,P4,KP) FVAL2 = F(ABSC2)*W(ABSC2,P1,P2,P3,P4,KP) FV1(JTWM1) = FVAL1 FV2(JTWM1) = FVAL2 FSUM = FVAL1+FVAL2 RESK = RESK+WGK(JTWM1)*FSUM RESABS = RESABS+WGK(JTWM1)*(ABS(FVAL1)+ABS(FVAL2)) 15 CONTINUE RESKH = RESK*0.5D+00 RESASC = WGK(8)*ABS(FC-RESKH) DO 20 J=1,7 RESASC = RESASC+WGK(J)*(ABS(FV1(J)-RESKH)+ABS(FV2(J)-RESKH)) 20 CONTINUE RESULT = RESK*HLGTH RESABS = RESABS*DHLGTH RESASC = RESASC*DHLGTH ABSERR = ABS((RESK-RESG)*HLGTH) IF(RESASC.NE.0.0D+00.AND.ABSERR.NE.0.0D+00) 1 ABSERR = RESASC*MIN(0.1D+01,(0.2D+03*ABSERR/RESASC)**1.5D+00) IF(RESABS.GT.UFLOW/(0.5D+02*EPMACH)) ABSERR = MAX((EPMACH* 1 0.5D+02)*RESABS,ABSERR) RETURN END