Thermally comptonized continuum model

NOTE: This model is now in the Xspec release and this page is superceded by the Xspec manual

This is the thermally comptonised continuum model of Zdziarski, Johnson & Magdziarz 1996, MNRAS, 283, 193, as extended by Zycki, Done & Smith 1999, MNRAS 309, 561. Please reference these papers if you use it. A detailed description of how it differs from an exponentially cutoff power law is below, but in summary the parameters are

par1     =  Gamma, asymptotic power-law photon index.
par2     =  kT_e, electon temperature (high energy rollover)
par3     =  kT_bb, seed photon temperature (low energy rollover)
par4     =  inp_type, 0 or 1 for blackbody of diskblackbody seed photons, respectively
par5     =  redshift
K     =  normalization, unity at 1 keV for a norm of 1.

Nthcomp is a *much* better description of the continuum shape from thermal comptonisation than an exponentially cutoff power law, but is not that much more complicated in terms of parameters. The high energy cutoff is sharper than an exponential, and is parameterised by the electron temperature (kT_e). VERY roughly, an exponential rollover energy E_c=2-3kT_e but the shape is very different, so it impacts on the reflected fraction as well. Another major effect (especially for X-ray binaries) is that it incorporates the low energy rollover. The hot electrons Compton UPscatter seed photons so there are few photons in the scattered spectrum at energies below the typical seed photon energies, making it significantly different to a power law below this energy. Typically the physical picture is that these seed photons are (quasi)blackbody (eg neutron star boundary layer) or disc blackbody in shape. Either of these shapes can be selected (input type), both being parameterised by a seed photon temperature (kT_bb). Between the low and high energy rollovers the shape of the spectrum is set by the combination of electron scattering optical depth and electron temperature. It is not necessarily a power law, but can be parameterised by an asymptotic power law index (Gamma). Details of this are given in Zycki, Done & Smith (1999), including a self-consistent reflection component which is NOT released here as it was written using non-FITS standard files so has significant issues with portability.

The source code and model.dat entries are available.


Keith Arnaud, Lab. for High Energy Astrophysics, NASA/Goddard Space Flight Center

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