REFINEMENTS TO THE LEIT CALIBRATIONSThis article describes recent refinements to the low energy imaging telescope, LEIT, calibrations. These represent small changes and in general are only relevant to grating observations. They are based on the final reduction and evaluation of the ground calibration measurements of both LE telescopes as well as the results of in-flight calibrations using grating observations. A final version of the Current Calibration File (CCF) will be released in the near future that will include new values for the filter characteristics and the 1000 l/mm grating (LE1) Line-Spread Function (LSF). This new CCF will also include the update to the LE misalignment described in Express No 17, p3.A re-analysis of the ground calibration filter measurements has shown slightly different values for the mass-absorption coefficients of the materials used in the polypropylene and aluminium-parylene (Al/P) filters. The polypropylene revised numbers mainly concern small changes in depth of the absorption edges. For the Al/P filter the changes are again small and result from the fact that the mass- absorption coefficient of aluminium shows an oscillatory behaviour shortward of the L-edge at 170Å. This small effect is known to be present from continuum synchrotron radiation measurements (Haensel et al. 1970, Phys. Stat. Sol. A. 2, 85), and is due to quantum effects within the filter. Although the groundbased measurements were of insufficient resolution, the oscillatory behaviour can be well parameterized by in-flight 500 l/mm grating observations of HZ43 and Sirius-B. Figure 1 shows curves of the mass-absorption coefficient, as measured during ground calibrations (solid line) and the modification derived from the grating measurements (thin line) in the wavelength range 60 to 170Å. The spacing of the energy grid in the CCF (record A1) in the range 60 to 170Å is too wide to give a proper description of the oscillatory behaviour and we provide at the end of this report a routine (FUNCTION EXO_ALUM) which calculates the mass-absorption coefficient (in units of cm2g-1) at any particular energy EN (in keV). The effects of this change are minor and inclusion of the new coefficients is only warranted in the reduction of grating observations, and perhaps filter observations of sources with strong line-emission (or a drastic change in flux) within the 60-170Å band. The on-axis filter thickness (gcm-2) for all filters, as derived from the final ground calibration analysis, are given in Table 1. The off-axis values for the filter thickness deviate at most 3 % from this value, with the exception of the Boron filter. In general these revised figures are at most only a few percent different from those given originally and are only relevant to grating spectra. Line profiles for the 1000 l/mm grating on LE1 were derived from ground based (Longbeam test) measurements at 8 energies. Cores of lines at short wavelengths ( 25 Å) are similar to a Gaussian profile. However, the wings deviate from this curve and are asymmetric. The line-profile at longer wavelengths ( 25 Å) deviates strongly from a simple profile. There is always an extended wing at the long-wavelength side of the line-center. Therefore only the measured 1000 l/mm line-profiles at 8 different energies are given in the E3 record in the CCF. The values of FWHM and HEW, which are ambiguously defined, are not provided in E2 (all data are set to -1), to prevent confusion.
H. van der Woerd
Figure 1.Mass Absorption coefficent versus wavelength (30 to 200 Å) for Aluminium, as derived from the 500 l/mm soft X-ray spectra of HZ43 and Sirius-B (thin line), and as derived from ground calibration (heavy line). The dots represent laboratory measurements by Haensel et al. (1970).
Table 1The on-axis filter thickness (*10-5 gcm-2) for both telescopes.
C C********************************************************** C THIS FUNCTION CALCULATES THE MASS-ABSORPTION COEFFICIENTS C FOR ALUMINUM (cm2/gm) at the energy EN (keV). C THE COEFFICIENTS FOR THE WAVELENGTH INTERVAL 60-170 A C ARE DETERMINED BY SPLINE CURVES. C C DATA ARE BASED ON MEASUREMENTS OF EXOSAT FILTERS AT THE C SPACE RESEARCH LABORATORY IN UTRECHT. C C C AUTHOR : F. PAERELS, SPACE RESEARCH LABORATORY UTRECHT C C*********************************************************** C REAL MA_SPLINE DIMENSION W(20),AMURHO(20) DIMENSION CC(4 ,20) DATA W/ ! Angstrom; wavelength grid & 5.9000E+01, 6.0480E+01, 6.2250E+01, 6.8500E+01, & 7.1260E+01, 7.3800E+01, 8.8560E+01, 9.1840E+01, & 9.5370E+01, 9.9190E+01, 1.0500E+02, 1.1310E+02, & 1.2750E+02, 1.3000E+02, 1.4500E+02, 1.5500E+02, & 1.5600E+02, 1.6980E+02, 1.7000E+02, 2.0000E+02/ DATA AMURHO/ ! cm2/gr; values for these gridpoints & 5.0999E+04, 5.6657E+04, 6.5144E+04, 6.7514E+04, & 7.0802E+04, 7.7989E+04, 7.7225E+04, 8.5253E+04, & 9.1370E+04, 1.0628E+05, 1.3381E+05, 1.1622E+05, & 1.1660E+05, 1.3457E+05, 9.1752E+04, 6.5832B+04, & 5.5434E+04, 7.4166E+04, 7.4166E+04, 7.4166E+04/ C ! spline coefficients for these gridpoints DATA (CC(i,l),i=1,4)/ 3.4974E+2, 8.4669E+1, 3.3693E+4, 3.8096E+4/ DATA (CC(i,2),i=1,4)/ 7.0796E+1,-1.9428E+2, 3.1788E+4, 3.7413E+4/ DATA (CC(i,3),i=1,4)/-5.5019E+1, 2.2482E+1, 1.2572E+4, 9.9241E+3/ DATA (CC(i,4),i=1,4)/ 5.0911E+1, 5.6332E+1, 2.4074E+4, 2.5224E+4/ DATA (CC(i,5),i=1,4)/ 6.1211E+1,-6.1606E+1, 2.7480E+4, 3.1102E+4/ DATA (CC(i,6),i=1,4)/-1.0602E+1, 9.8130E+0, 7.5934E+3, 3.0942E+3/ DATA (CC(i,7),i=1,4)/ 4.4159E+1,-3.8740E+1, 2.3069Z+4, 2.6409E+4/ DATA (CC(i,8),i=1,4)/-3.5996E+1, 4.3394E+1, 2.4600E+4, 2.5343E+4/ DATA (CC(i,9),i=1,4)/ 4.0100E+l, 2.5150E+l, 2.3334E+4, 2.7455E+4/ DATA(CC(i,10),i=1,4)/ 1.6536E+1,-4.7428E+1, 1.7734E+4, 2.4631E+4/ DATA(CC(i,ll),i=1,4)/-3.4019E+1, 3.0335E+0, 1.8751E+4, 1.4149E+4/ DATA(CC(i,12),i=1,4)/ 1.7064E+0, 1.6030E+1, 7.7170E+3, 4.7734E+3/ DATA(CC(i,13),i=1,4)/ 9.2331E+1,-1.5922E+2, 4.6064E+4, 5.4823E+4/ DATA(CC(i,14),i=1,4)/-2.6536E+1, 1.4723E+1, 1.4942E+4, 2.8042E+3/ DATA(CC(i,15),i=1,4)/ 2.2084E+1,-4.8090E+1, 6.9668E+3, 1.1392E+4/ DATA(CC(i,16),i=1,4)/-4.8090E+2, 5.6471E+2, 6.6313E+4, 5.4869E+4/ DATA(CC(i,17),i=l,4)/ 4.0921E+1,-2.3517E+1,-3 7761E+3, 9.8529E+3/ DATA(CC(1,18),i=l,4)/-1.6227E+3,-1.5906E+3, 3.7090E+5, 3.7090E+5/ DATA(CC(i,l9),i=1,4)/-1.0604B+1, 2.1422E+1, 1.2016E+4,-1.6807E+4/ DATA(CC(i,20),i=1,4)/ 0.0000E-l, 0.0000E-1, 0.0000E-1, 0.0000E-1/ C M = 20 ! NR OF SPLINE CURVES ALNE = ALOG(EN) IF(EN.GT.0.0728) GOTO 10 C C** COEFFICIENTS FOR ENERGIES LE 0.0728 KEV C RLN = 4.73 - 1.58*ALNE - 0.046*ALNE*ALNE C C** COEFFICIENTS FOR ENERGIES GT 0.0728 KEV AND LE 0.210 KEV 10 IF(EN.GT.0.210)GOTO 20 WW = 12.3985 / EN ! Angstrom RLN = ALOG(MA_SPLINE(W,AMURHO,M,CC,WW)) GOTO 100 C C C** COEFFICIENTS FOR ENERGIES GT O.210 KEV AND LE O.54 KEV 20 IF(EN.GT.0.54)GOTO 30 RLN = 6.814 - 3.463*ALNE - O.567*ALNE*ALNE GOTO 100 C C** COEFFICIENTS FOR ENERGIES GT 0.54 KEV AND LE 1.56 KEV C 30 IF(EN.GT.1.56)GOTO 40 RLN = 7.105 - 2.756*ALNE - O.173*ALNE*ALNE GOTO 100 C C** COEFFICIENTS FOR ENERGIES GT 1.56 KEV AND LE 10 KEV C 40 RLN = 9.539 - 2.501*ALNE - 0.095*ALNE*ALNE GOTO 100 C C** TAKE EXPONENT OF INTERPOLATED VALUE 100 EXO_ALUM = EXP(RLN) RETURN END C C********************************************************* C REAL FUNCTION MA_SPLINE(X,Y,M,C,XINT) DIMENSION X(*), Y(*), C(4,*) IF (XINT-X(1)) 70, 10, 20 10 MA_SPLINE= Y(1) RETURN 20 K=1 30 IF (XINT-X(K+1)) 60, 40, 50 40 MA_SPLINE= Y(K+1) RETURN 50 K= K+1 IF (M-K) 70, 70, 30 60 YINT= (X(K+l)-XINT)*(C(1,K)*(X(K+1)-XINT)**2+C(3,K)) MA_SPLINE= YINT + (XINT-X(K))*(C(2,K)*(XINT-X(K))**2+C(4,K)) RETURN 70 WRITE (*,*),' OUT OF RANGE ' RETURN END C C****************************************************************
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