Modelling the vignetting function of eROSITA
This is a holding page to gather together notes on producing an analytic vignetting model for eSASS tasks
Problem: The current method to represent the eROSITA vignetting function in the eSASS required interpolation from a tabulated grid of calibration measurements, this is computationally awkward, and can lead to discontinuities in the derived system response. Desired improvement: Compute an analytic description of the vignetting function of each eROSITA telescope module, and save the parameters of this model into the CALDB
Zeroth order model (TD)
Derivation of model parameters
- Start from the vignetting description file supplied with the current version of SIXTE (share/sixte/instruments/srg/erosita_vignetting_v2.1.fits)
- this contains a list of vignetting values evaluated at 3 energy bands and 31 offaxis angles
- it is not clear what mean energy should be assumed for each energy band, we assume 1.25keV, 4.5keV and 7.5keV.
- this contains a list of vignetting values evaluated at 3 energy bands and 31 offaxis angles
- For each energy value we fit a simple model as a function of off-axis angle
- We assume a uniform 1 sigma uncertainty of 1e-3 per data point
- A pseudo-Moffat distribution is found to give a reasonable match to the tabulated values, i.e. vign(oa) = [1 + (oa/theta0)**alpha]**beta
- The values of theta0,beta,alpha are then interpolated using a quadratic expression to allow evaluation of the expression at any energy
- This quadratic form does strange things at energies above the upper tabulated energy band and so the vignetting model is assumed to be constant in energy above 7.5keV
- future versions will be based on more energy bands (five or six?) than the three available here
Figures demonstrating the fit
The parameters describing the model
Results of fits at each energy:
- functional form is:
vign(θ,θ0,β,α) = ((1.0 + (θ/θ0)α)β)
- where
- θ = off-axis angle in degrees
θ0 is a scaling parameter, also in degrees
- α, β are dimensionless exponents
- independent fits at each of [1.25, 4.0, 7.5] keV give:
Energy= 1.25 keV: theta0= 0.44966 +- 0.02004 beta=-1.02111 +- 0.05693 alpha= 1.71288 +- 0.01767 Energy= 4 keV: theta0= 0.22575 +- 0.00860 beta=-0.83151 +- 0.04289 alpha= 1.97408 +- 0.03523 Energy= 7.5 keV: theta0= 0.10547 +- 0.00350 beta=-0.50753 +- 0.03063 alpha= 2.52732 +- 0.09069
we can describe this as a matrix of coefficients [3 coeffs X Nenergies]
coeff[1,1],coeff[2,1],coeff[3,1] = [ 0.44966, -1.02111, 1.71288] coeff[1,2],coeff[2,2],coeff[3,2] = [ 0.22575, -0.83151, 1.97408] coeff[1,3],coeff[2,3],coeff[3,3] = [ 0.10547, -0.50753, 2.52732]
- clipping of model in energy:
emin = 0.0 emax = 7.5 clip(eraw) = (eraw<emin?emin:(eraw>emax?emax:eraw))
Lagrangian polynomial interpolation (https://en.wikipedia.org/wiki/Lagrange_polynomial)
- given three points on the plane at (x1,y1), (x2,y2), (x3,y3), what is the quadratic equation that passes through all of them?
lagr(x,x1,x2,x3,y1,y2,y3) = y1*((x-x2)/(x1-x2))*((x-x3)/(x1-x3)) + y2*((x-x1)/(x2-x1))*((x-x3)/(x2-x3)) + y3*((x-x1)/(x3-x1))*((x-x2)/(x3-x2))
- Therefore, energy dependent versions of theta0,beta,alpha are given by
f_theta0(energy) = lagr(clip(energy),e[1],e[2],e[3],coeff[1,1],coeff[1,2],coeff[1,3]) f_beta(energy) = lagr(clip(energy),e[1],e[2],e[3],coeff[2,1],coeff[2,2],coeff[2,3]) f_alpha(energy) = lagr(clip(energy),e[1],e[2],e[3],coeff[3,1],coeff[3,2],coeff[3,3])
- And so the general vignetting function is:
vign_gen(oa,energy) = vign(oa,f_theta0(energy),f_beta(energy),f_alpha(energy))
Description of model in CALDB
- See script: "/home/erosita/sw/eSASSdevel/erosita/task/srctool/scripts/build_avign_caldb_files.csh"
Using the analytic vignetting model in eSASS
- See module eSASS "/home/erosita/sw/eSASSdevel/erosita/task/srctool/srctool_generic_avign_mod.f90"