Evolution of the E peak vs. Luminosity Relation for Long GRBs

1. Evolution of the Epeak vs. Luminosity Relation for Long GRBs W.J. Azzam& M.J. Alothman Department of Physics University of Bahrain Kingdom of Bahrain wjazzam@sci.uob.bh

2. Outline1- Luminosity Indicators2- Data Sample3- Earlier Work4- Current Results5- Conclusion

3. Energy Relations / Luminosity Indicators 1-Lag relation (L – lag) 2-Variability relation (L – V) 3-Amati relation (Ep – Eiso ) 4- Yonetoku relation (Ep – Liso) 5- Ghirlanda relation (Ep – E) 6- Liang-Zhang relation (Ep – Eiso – tb) 7- “Firmani” relation (Ep – Liso – T0.45) more to come …

4. The importance of these relations lies in: 1- Their potential use as cosmological probes. For instance, to constrain M and (Ghirlanda et al. 2006; Capozziello & Izzo 2008; Amati et al. 2008). 2- Insight into the physics of GRBs.

5. Some generalized tests have been carried out to check the robustness of these relations (Schaefer & Collazi 2007) and in fact to produce a GRB Hubble diagram (Schaefer 2007).

6. On the other hand, some studies have tried to deal with the problems of circularity and selection effects: Li et al. (2008) Butler et al. (2008) Ghirlanda et al. (2008) Nava et al. (2009)

7. General purpose of our study: do some (or all) of these relations evolve with z? • In an earlier study(Azzam, Alothman, & Guessoum 2008) we looked at the possible evolution of: 1- the time-lag, lag, relation 2- the variability, V, relation • In this study we consider: possible evolution of the Epeak vs. L relation. • Data sample: 69 GRBs taken from Schaefer (2007).

8. Earlier Results The entire data sample consists of 69 GRBs, of which 38 have lag values and 51 have V values.The method consists of binning the data by redshift, z, then writing the time-lag relation in the form: log(L) = A + B log[lag / (1+z)] and extracting the fit parameters A and B for each redshift bin.

9. Likewise, for the variability relation, which we write in the form: log(L) = A + B log[V (1+z)]. The objective is then to see whether the fitting parameters A and B evolve in any systematic way with the redshift.

10. Note that the binning was done in two ways for each of the two relations: Binning by number in which the number of bursts per bin was fixed. Binning by width in which the z was fixed.

13. Figure 1. The best fit lines for the three redshift bins (binning by number) that are presented in Table 1 for the lag-relation, showing a systematic variation of the A and B parameters with redshift.

14. Figure 2. The best fit lines for the three redshift bins (binning by number) that are presented in Table 2 for the variability relation, showing no systematic variation of the A and B parameters with redshift.

15. Current Study We write the Epeak vs. L relation in the form: log(L) = A + B log[Epeak (1+z)] Again, we bin the data, extract the fitting parameters A and B, and see whether they evolve in any systematic way with redshift.

21. Conclusion In this study, a sample consisting of 69 GRBs was used to investigate the possible evolution of the Epeak vs. L relation. The data was binned in redshift, and the fit parameters A and B were extracted. The parameters A and B showed no systematic dependence on z, and hence the Epeak–L relation does not seem to evolve in any systematic way with redshift.

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