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Probing Accretion and Spacetime with Black Hole Binaries. Shane Davis IAS. Omer Blaes Ivan Hubeny Neal Turner Julian Krolik Jim Stone Shigenobu Hirose. Chris Done Matthew Middleton Marek Gierlinski Rebecca Shafee Ramesh Narayan Jeff McClintock Ron Remillard Li-Xin Li.
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Probing Accretion and Spacetime with Black Hole Binaries Shane DavisIAS Omer BlaesIvan HubenyNeal TurnerJulian KrolikJim StoneShigenobu Hirose Chris DoneMatthew MiddletonMarek GierlinskiRebecca ShafeeRamesh NarayanJeff McClintockRon RemillardLi-Xin Li
Issues Addressed in This Talk • How does the release of gravitational binding energy lead to thermal radiation? • Are thin disk (-disk) models sufficient to explain black hole X-ray binary (BHB) observations? • How do lifting the simple assumptions of the -disk model alter the spectra? • Black hole spin estimates
The thin disk model • H/R << 1 • Constant accretion rate; time-steady • Gravitational binding energy released locally as radiation: The -disk model • determines surface density • Vertical dissipation distribution:
The Multicolor Disk Model (MCD) • Assumes simple temperature distribution: • Spectrum assumed to be color-corrected blackbody: F F
Spectral Formation • Depth of formation *: optical depth where (esabs)1/2~1 > *: absorbed < *: escape • Therefore Thomson scattering produces modified blackbody: • Compton scattering gives softer Wien spectrum which Shimura & Takahara claim is consistent with fcol~1.7 for BHBs = 0 es= 1 (es abs)1/2= 1 abs= 1
Disk Dominated Spectra LMC X-3 • L prop. to T4 suggests fcol and emitting area are constant Gierlinski & Done 2004
Comparison with Previous Spectral Models • Previous -disk models provide mixed results • Shimura & Takahara (1995); full atmosphere calculation, free-free emission and Compton scattering: stars • Merloni, Fabian & Ross (2000); relativistic effects, constant density, f-f emission and Compton scattering: blue curve • Small scatter in L-T relation as L varies by over an order of magnitude Gierlinski & Done 2004
How can we improve on these models? • Include metals with bound-free opacity; solve non-LTE populations • More accurate radiative transfer and better treatment of Compton Scattering • Can consider the effects of more complicated physics: e.g. dissipation, magnetic stresses, and inhomogeneities
Our Models, Briefly • Use conservation laws with Kerr metric to calculate one-zone model • Full disk model is determined by ~4 parameters: M, a*, L/LEdd, • Calculate self-consistent vertical structure and radiative transfer in a series of concentric annuli • Each annulus is determined by 3 parameters (+ assumptions): Teff, Q, (g=Q z), • Calculate photon geodesics in a relativistic spacetime (ray tracing) -- determined by a* and i
Model Parameters L/LEdd Inclination Spin Mass
‘Broadband’ Fits to LMC X-3 Our Model MCD • MCD model is too narrow -- need relativistic broadening 2 ~ 100 • Best fit find spinning black hole with a*=0.27
Luminosity vs. Temperature • We generate artificial spectra and fit MCD model • Then, we follow the procedure of Gierlinski & Done (2004) to calculate Ldisk/Ledd and Tmax • Model: a=0, i=70o, M=10 solar masses, and =0.01
Luminosity vs. Temperature • Slight hardening is consistent with some observations • Allows one to constrain surface density and accretion stress • Models become effectively optically thin at high accretion rates =0.1 =0.01 =0.001
Local MRI Simulations(with radiaton) • Shakura & Sunyaev (1973): • Turner (2004): Mass more centrally concentrated towards midplane in simulations. • Magnetic fields produced near midplane are buoyant and dissipate more energy near the surface … Turner (2004)
Dissipation Profile • … but modified dissipation profile has limited affect on the spectrum. • This particular annulus is very effectively optically thick and *is close to surface Turner Profile SS73 Profile
Dissipation Profile • For effectively optically thin annulus, the spectra from the modified dissipation profile is considerably harder • This will exacerbate the discrepancy between observations and models unless disks stay optically thick Turner Profile SS73 Profile
Magnetically Dominated Atmospheres • Magnetic pressure support leads to lower * and higher T* to give somewhat harder spectrum • In this case lower * alters statistical equilibrium -- lower recombination rate relative to photoionization rate give more highly ionized matter with lower bound-free opacity No B field B field
Spin Estimates • With independent estimates for the i, M, and D, thermal component only has two free parameters: L/LEdd and a* --same number as diskbb (Tmax, normalization) • Fits with our models suggest moderate (a* < 0.9) values for most sources (with possible exception of GRS 1915-105) Shafee et al. 2005
Summary of Spin Estimates Source _i_a/M GRO J1655-40 70o ~ 0.7 LMC X-3 67o < 0.3 XTE J1550-564 72o < 0.6 XTE 4U 1543 20.7o ~ 0.8 GRS 1915-105 66o > 0.98 or ~ 0.8
Dependence on Inclination LMC X-3 Davis, Done & Blaes 2005
Misaligned Jets? • e.g. microquasar XTE J1550-564 • Hannikainen et al. (2001) observe superluminal ejections with v > 2 c • Ballistic model: • Orosz et al. (2002) found i=72o • Non-aligned jets not uncommon -- usually assumed that BH spin differs from binary orbit and inner disk aligns with BH -- Bardeen-Petterson effect • Best fit inclination, spin: i=43o, a*=0.44 • More examples: Maccarone (2002)
What Have We Learned? • Our detailed accretion disk models can reproduce the spectra of disk dominated BHBs (better than the MCD for “broadband” spectra of LMC X-3) • Models qualitatively reproduce the observed evolution with luminosity; spectral modeling may constrain the nature of angular momentum transport and black hole spin • Dissipation, magnetic stresses, and inhomogeneities can affect the spectra -- more simulations or analytical progress needed.Magnetic Stresses • B2/8 & dF/dm taken from simulations of Hirose et al. • Gas pressure dominated -- dF/dm has little effect on the structure • Extra magnetic pressure support lengthens scale height hr • *~*/(es hr)
