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Monochromatic Energy for Low Energy Bands

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Introduction

As discussed in the Why topic: Selecting a Monochromatic Energy, there are several approaches to selecting a monochromatic energy appropriate for any arbitrary energy band. This page extends that topic and discusses the challenges when selecting a monochromatic energy for soft energy bands (low energies).

The Chandra Source Catalog establishes a soft-energy band that goes from 0.5-1.2 keV. The same energy limits are used for this analysis. The CSC project also adopted a value of 0.92keV as the characteristic monochromatic energy for this band. The CSC uses this value is used as the characteristic monochromatic energy creating exposure maps. The exposure maps are then used when computing photon fluxes (photflux_aper_s). The srcflux script uses the exposure map in the same way to compute net_photflux_aper values. These photon fluxes and exposure maps are also used when computing certain hardness ratio values and when computing limiting sensitivity. In addition, this value is used in release 1 of the CSC for creating monochromatic PSFs.

Why is the soft band special?

First, the ACIS effective area is variable due to the continued build up of a spatially varying contaminant on the detector. This affects the detector quantum efficiency predominantly at low energies (generally less than 1keV). In Figure 1. we show the effective area for a source at the aimpoint on the ACIS-I detector. Each curve is for a different observation cycle ("ao") -- basically a separate curve for each calendar year.

Second, the intrinsic quantum efficiency of the ACIS CCDs in the soft band rapidly increases with increasing energy, peaking at the 1.49keV Si edge where the efficiency drops.

Considering these two effects, we then see that any spectral model, folded through the response at the same location on the detector and imaged at the same off-axis angle will produce a different spectral weighted mean energy depending on the date of the observation. We can see this in Figure 2.

What happens when we use a fixed monochromatic energy?

We can replot the data in Figure 2 to show the spectral weighted mean energy versus time. This is shown in Figure 3.

We see in Figure 3 that the spectral weighted mean energy, assuming a fixed spectral model, changes over the lifetime of the mission. However, the change appears relatively small, on the order of only 80eV. The more interesting question is how much does the effective area change? Specifically, how much does the effective area at 0.92keV compare to the effective area at the spectral weighted mean energy? This is shown in Figure 4.

Figure 4 shows that even though the change in mean energy is small (only about 80eV), because the slope of the effective area curve is very steep in the soft band, a small change in energy results in a large change in effective area. For the standard absorbed power law model used here the difference in effective area is over 40% in AO20 which will result in photon flux estimates being 1.67 times higher than in early AOs. So, even though the count rate will be lower in AO20 compared to AO03, the photon flux will be higher.

Another way to think about this is to go back and revisit the canonical absorbed power law model. With the early mission effective area curves using an absorbed powerlaw with nH=0.03 and PhoIndex=1.7 we obtain a spectral weighted mean energy of 0.92keV. If we use the late mission effective area curves, what model parameters are needed to produce the same mean energy?

In Figure 5 we show how the computed mean energy varies with model parameters if we use the early AO03 ARF vs. the later AO20 ARF. The horizontal dashed line shows the nominal 0.92keV monochromatic energy. For the early AO data (left) we can see that there is a large range of nH and PhoIndex values which yield a mean energy around 0.92 keV. However, the later AO data (right) shows that with nH=0, we cannot get a mean energy equal to 0.92keV until the photon index of the power law model component is over 4.

Therefore, another way to think of this effect is that by adopting a static monochromatic value we are in essence choosing to vary the spectral model parameters with time.

What about exposure maps?

This study was initiated based on the observation that three-color images using the standard CSC energy band definitions for recently obtained datasets appeared to all systematically have a larger soft-band contribution. In simple terms: the images appeared more red. We see this in Figure 6 where the calibration target, Abell1795, appears to have an overall increase in soft-band photon flux causing the three-color image to have a red hue.

This is of course counter intuitive. Given the increase in contamination we might expect the soft-band flux to decrease with time; not increase.

What is happening is that the soft band counts are indeed decreasing; but the mean energy of those events that are detected is increasing. By choosing a fixed monochromatic energy those counts are being corrected for a lower effective area ; thus causing the flux to be biased higher.

This figures shows the extremes of a very early to a very recent dataset; there are many additional observations during the mission which show how the soft-band changes incrementally. Obviously other variables such as changes in the background and other factors may also contribute to this change; however, this effect is seen in all the more recent datasets so it suggests something more systematic which is what lead this analysis.

So then is using 0.92keV wrong?

No.

The choice of 0.92keV is fine. From this analysis it is clear that any fixed monochromatic energy used for the soft-band will be subject to the same biases. This is due to the steep slope of the effective area curve in this part of the spectrum. In the other energy bands the effective area changes more gradually with energy so they are less sensitive to small energy changes.

Care must be taken when interpreting the soft band photon flux values. The values are: the soft band counts divided by the effective area at 0.92keV. That is all that can be said. It would be wrong to suggest that 0.92keV represents the spectral weighted mean energy for our standard absorbed power law -- it may for some observations, but may not for others.

Users should also be cautious when comparing soft band photon fluxes in the context of long-term temporal variability.