SONG and mini-SONG Observations of GRB Pulsed Emission Jon Hakkila Presented at the 4th SONG Workshop September 17, 2011 Presented at the 4th SONG Workshop September 17, 2011 Collaborators: Rob Preece, Tom Loredo, Carlo Graziani, Robert Wolpert, Bruce Grossan, Jim Neff, Jason Jackiewicz, Frank Hill, Travis Metcalfe, Alex Greene.
Gamma-ray bursts are the most energetic explosions in the Universe.
General Gamma-Ray Burst Properties keV, keV, keV, 300 keV-1 MeV Spectra E pk Light Curves Synchrotron shock model (e.g. Rees & Meszaros, ApJL, 1994, 430, 94) or jitter radiation (Medvedev 2000, ApJ 540, 704.
GRB Progenitors ShortLong Hypernova Central Engine Model of Long GRBs Merging Compact Objects Central Engine Model of Short GRBs
Many GRB bulk properties (e.g. lag, E peak, variability) correlate with luminosity. How can the intrinsic effects leading to these correlations be separated from other effects (e.g. class differences and selection biases)? GRB complexity results from overlapping pulses. Long and Short GRBs appear to be inherently different. Relativistic cosmology alters GRB observed properties: Energy shift: distant GRBs have their fluxes shifted to lower observed energies than similar nearby ones. Inverse square law: distant GRBs appear fainter than similar nearby ones Time dilation: distant GRBs have longer durations and temporal structures than similar nearby ones. Energy shift: distant GRBs have their fluxes shifted to lower observed energies than similar nearby ones.
Pulse peak flux (p 256 ) - peak flux of summed multichannel data (black) measured on 256 ms timescale. Pulse duration - time span when flux is e -3 of pulse peak flux. Pulse peak lag- time span between channel 3 peak ( keV; green) and channel 1 peak (25-50 keV; red). Fluence - time-integrated flux. Hardness - ratio of channel 3 fluence to channel 1 fluence. Asymmetry - pulse shape measure; 0 is symmetric and 1 is asymmetric. GRBs can be deconvolved into pulses exhibiting Inherent time asymmetries (longer decay than rise rates), Hard-to-soft spectral evolution, and Longer durations at lower energies. Inherent time asymmetries (longer decay than rise rates), Hard-to-soft spectral evolution, and Longer durations at lower energies. Black - summed 4-channel emission Green - high energy channel emission Red - low energy channel emission Observable Pulse Properties - obtained using semi-automated 4-parameter pulse model (Norris et al ApJ, 627, 324; Hakkila et al ApJ 677, L81):
Pulse-fitting example: GRB a (BATSE 3480) 25 keV - 1 MeV keV keV50 keV keV25 keV - 50 keV300 keV - 1 MeV
100 keV keV 50 keV keV25 keV - 50 keV Pulse-fitting example: GRB (BATSE 0840) 25 keV - 1 MeV keV - 1 MeV
100 keV keV50 keV keV25 keV - 50 keV 25 keV - 1 MeV 12 Pulse-fitting example: GRB (BATSE 2600)
The GRB pulse lag and pulse duration vs. pulse luminosity relations The GRB lag vs. luminosity relation (Norris, Marani, & Bonnell 2000, ApJ 534, 248) is actually a pulse lag vs. pulse luminosity relation (Hakkila et al. 2008, ApJ 677, L81). Pulse duration also correlates with pulse lag, so pulse duration also indicates luminosity. Peak luminosity (L) vs. duration (w) and lag (l 0 ) for BATSE GRBs.
Some low-z BATSE bursts BATSE 0332; z ≈ 0.9 BATSE 0563; z ≈ 0.8BATSE 1406; z ≈ 0.8 BATSE 0111; z ≈ 0.9BATSE 0214; z ≈ 4.3BATSE 0237; z ≈ 5.3 BATSE 0803; z ≈ 4.6BATSE 0594; z ≈ 5.4 Some high-z BATSE bursts Correlated pulse properties can be used to estimate GRB redshifts (Hakkila, Fragile, & Giblin, 2009, AIP Conf. 1133, 479).
Related Pulse Property Correlations 1338 pulses in 610 BATSE GRBs: (Hakkila and Preece, 2010 ApJ (in press))
Long (upper) and Short (lower) GRB Pulse Correlations GRB pulse property correlations: short duration pulses have shorter lags, are brighter, are harder, and are more time symmetric than long duration pulses (Hakkila and Preece, ApJ 2011 (in press)).
Pulse Observations from HETE-2 and Swift Pulse lag and pulse duration vs. pulse luminosity relations are found in HETE-2 (Arimoto et al. 2010, PASJ, 62, 487) and Swift x-ray flares (Chincarini et al. (MNRAS, 2010, 406, 2113). X-ray flares intensities decrease and pulse durations increase with time after the trigger (Margutti et al. 2010, MNRAS, 406, 2149).
How can peak flux correlations be reconciled with differing luminosities of Short and Long GRBs? (Margutti 2010, private communication). > Short and Long GRB pulses might represent two parallel luminosity distributions, or might represent a single distribution offset by an unknown parameter (e.g. beaming angle). How can peak flux correlations be reconciled with differing luminosities of Short and Long GRBs? (Margutti 2010, private communication). > Short and Long GRB pulses might represent two parallel luminosity distributions, or might represent a single distribution offset by an unknown parameter (e.g. beaming angle). Short Swift GRBs (Norris, Gehrels, and Scargle 2011, ApJ 735, 23) extend the peak flux vs. duration relation to ms timescales. > Short and Long burst observable pulse properties appear to indicate a single distribution. » GRB pulses have similar correlated properties independent of GRB class (and potentially of progenitor, environment, etc.).
Correlative properties are bulk measurements of hard-to-soft pulse evolution Epeak pulse decay (Peng et al. 2009, ApJ 698, 417) Pulses start near-simultaneously at all energies (Hakkila and Nemiroff 2009, ApJ 705, 372), then have spectra which evolve from high- to low-energy dominant
Pulse physics appears ubiquitous and is easily replicated across a variety of GRB environments. Properties of individual pulses within Long and Short GRBs may not be appropriate classification tools whereas pulse distributions within a GRB may be. Theoretical pulse model needs not have many free parameters. Standard model: Kinematic energy injection into a medium via relativistic shocks; the medium cools. Standard spectral model is preferentially a synchrotron spectrum (e.g. Rees & Meszaros, ApJL, 1994, 430, 94) or a thermal plus power law spectrum (e.g. Goodman 1986, ApJ 308, L47; Daigne & Mochkovitch 2002, MNRAS 336, 1271). Correlative pulse relations are not a direct and simple consequence of the standard synchrotron shock model, which has no time-dependent component (Boci, Hafizi, & Mochkovitch 2010, A&A, 519, 76). Electromagnetic jitter radiation appears to produce reasonable spectra coupled with short intensity tracking time histories that do not have correlated pulse properties (e.g. Medvedev, Pothapragada, & Reynolds 2009, ApJL, 702 L91). Curvature in a relativistic outflow can explain some late, but few early evolving pulse correlations (e.g. Qin et al., Phys. Rev. D, 2006). Implications of Correlated GRB Pulse Properties:
Optical flares accompany prompt emission… How can SONG and mini-SONG help us better understand GRB pulse physics?
Optical flares appear to be low-energy counterparts of x-ray flares. …and are also seen in the afterglow.
Optical pulses appear to belong to the same phenomenon as prompt and afterglow pulses. Optical pulse observations can be made: as part of a scheduled SONG observation. with offline SONG telescopes. with mini-SONG telescopes. with SONG and/or mini-SONG telescopes in conjunction with ancillary telescopes (e.g. UVI). Optical pulse observations can be made: as part of a scheduled SONG observation. with offline SONG telescopes. with mini-SONG telescopes. with SONG and/or mini-SONG telescopes in conjunction with ancillary telescopes (e.g. UVI). Questions needing to be addressed: How closely does prompt optical emission track high energy emission? Are prompt optical pulses low-energy components of prompt pulses, or are they simultaneous but separate low-energy pulses? Are late optical pulses a low-energy extension of x-ray flares? How are prompt and late optical pulses related? What constraints do pulse energetics and timing place on GRB models? Questions needing to be addressed: How closely does prompt optical emission track high energy emission? Are prompt optical pulses low-energy components of prompt pulses, or are they simultaneous but separate low-energy pulses? Are late optical pulses a low-energy extension of x-ray flares? How are prompt and late optical pulses related? What constraints do pulse energetics and timing place on GRB models?