Pulsar Timing and the Detection of Gravitational Waves

1. Pulsar Timing and the Detection of Gravitational Waves R. N. Manchester CSIRO Astronomy and Space Science Sydney Australia Summary • Review of pulsar properties and timing • Binary pulsars and GR tests • Detection of gravitational waves • Pulsar Timing Array (PTA) projects • Current status and future prospects

2. Spin-Powered Pulsars: A Census • Currently 2213 known (published) pulsars • 2050 rotation-powered disk pulsars • 213 in binary systems • 302 millisecond pulsars • 142 in globular clusters • 8 X-ray isolated neutron stars • 20 AXP/SGR • 21 extra-galactic pulsars Data from ATNF Pulsar Catalogue, V1.46 (www.atnf.csiro.au/research/pulsar/psrcat) (Manchester et al. 2005)

3. Pulsar Origins Pulsars are believed to be rotating neutron stars – two main classes: Normal Pulsars: • Formed in supernova • Periods between 0.03 and 10 s • Relatively young (< 107 years) • Mostly single (non-binary) (ESO – VLT) Millisecond Pulsars (MSPs): • MSPs are very old (~109 years). • Mostly binary • They have been ‘recycled’ by accretion from an evolving binary companion. • This accretion spins up the neutron star to millisecond periods. • During the accretion phase the system may be detectable as an X-ray binary system.

4. Pulsars as Clocks • Neutron stars are tiny (about 25 km across) but have a mass of about 1.4 times that of the Sun • They are incredibly dense and have gravity 1012 times as strong as that of the Earth • Because of this large mass and small radius, their spin rates - and hence pulsar periods – are extremelystable e.g., PSR J0437-4715 had a period of : 5.757451831072007  0.000000000000008 ms • Although pulsar periods are very stable, they are not constant. Pulsars lose energy and slow down • Typical slowdown rates are less than a microsecond per year

5. Measurement of pulsar periods • Start observation at a known time and average 103 - 105 pulses to form amean pulse profile • Cross-correlate this with a standard template to give the arrival time at the telescope of a fiducial point on profile, usually the pulse peak – the pulse time-of-arrival (ToA) • Measure a series of ToAsover days – weeks – months – years • Transfer ToAsto an inertial frame – the solar system barycentre • Compare barycentricToAswith predicted values from a model for the pulsar – the differences are called timing residuals. • Fit the observed residuals with functions representing errors in the model parameters (pulsar position, period, binary period etc.). • Remaining residuals may be noise – or may be science!

6. . The P – P Diagram Galactic Disk pulsars P = Pulsar period P = dP/dt = slow-down rate . . • For most pulsars P ~ 10-15 • MSPs haveP smaller by about 5 orders of magnitude • Most MSPs are binary, but few normal pulsars are • tc = P/(2P) is an indicator of pulsar age • Surface dipole magnetic field ~ (PP)1/2 . . . Great diversity in the pulsar population!

7. Sources of Pulsar Timing “Noise” • Intrinsic noise • Period fluctuations, glitches • Pulse shape changes • Perturbations of the pulsar’s motion • Gravitational wave background • Globular cluster accelerations • Orbital perturbations – planets, 1st order Doppler, relativistic effects • Propagation effects • Wind from binary companion • Variations in interstellar dispersion • Scintillation effects Pulsars are powerful probes of a wide range of astrophysical phenomena • Perturbations of the Earth’s motion • Gravitational wave background • Errors in the Solar-system ephemeris • Clock errors • Timescale errors • Errors in time transfer • Instrumental errors • Radio-frequency interference and receiver non-linearities • Digitisation artifacts or errors • Calibration errors and signal processing artifacts and errors • Receiver noise

8. PSR B1913+16: The First Binary Pulsar • Discovered at Arecibo Observatory by Russell Hulse & Joe Taylor in 1975 • Pulsar period 59 ms, a recycled pulsar • Doppler shift in observed period due to orbital motion • Orbital period only 7 hr 45 min • Maximum orbital velocity 0.1% of velocity of light Relativistic effects detectable!

9. Post-Keplerian Parameters: PSR B1913+16 Given the Keplerian orbital parameters and assuming general relativity: • Periastron advance: 4.226598(5) deg/year • M = mp + mc • Gravitational redshift + Transverse Doppler: 4.2992(8) ms • mc(mp + 2mc)M-4/3 • Orbital period decay: -2.423(1) x 10-12 • mpmc M-1/3 First two measurements determine mp and mc. Third measurement checks consistency with adopted theory. Mp = 1.4398 0.0002 Msun Mc = 1.3886 0.0002 Msun Both neutron stars! (Weisberg, Nice & Taylor 2010)

10. Orbital Decay in PSR B1913+16 • Orbital motion of two stars generates gravitational waves • Energy loss causes slow decrease of orbital period • Predict rate of orbit decay from known orbital parameters and masses of the two stars using GR • Ratio of measured value to predicted value = 0.997 +/- 0.002 PSR B1913+16 Orbit Decay • Confirmation of general relativity! • First observational evidence for gravitational waves! (Weisberg , Nice & Taylor 2010)

11. PSR J0730-3039A/B The first double pulsar! • Discovered at Parkes in 2003 • One of top ten science break-throughs of 2004 - Science • PA = 22 ms, PB = 2.7 s • Orbital period 2.4 hours! • Periastron advance 16.9 deg/yr! (Burgay et al., 2003; Lyne et al. 2004) Highly relativistic binary system!

12. Measured Post-Keplerian Parameters for PSR J0737-3039A/B GR value Measured value Improves as  Periast. adv. (deg/yr) - 16.8995  0.0007 T1.5  Grav. Redshift (ms) 0.3842 0.386  0.003 T1.5 Pb Orbit decay -1.248 x 10-12 (-1.252  0.017) x 10-12 T2.5 r Shapiro range (s) 6.15 6.2  0.3 T0.5 s Shapiro sin i 0.99987 0.99974 T0.5 . . +16 -39 GR is OK! Consistent at the 0.05% level! Non-radiative test - distinct from PSR B1913+16 (Kramer et al. 2006)

13. The Double Pulsar: Update • PSR J0737-3039B has disappeared! • Beam has moved away due to orbital precession • Expected to return in 5 – 10 years Good prospects for detection of relativistic orbit deformation and measurement of pulsar moment of inertia • Continued timing at Parkes and GBT has refined relativistic parameters • Now limits deviations from GR to 0.02% (Kramer et al. 2013)

14. Detection of Gravitational Waves • Prediction of general relativity and other theories of gravity • Generated by acceleration of massive object(s) • Astrophysical sources: • Inflation era fluctuations • Cosmic strings • BH formation in early Universe • Binary black holes in galaxies • Coalescing neutron-star binaries • Compact X-ray binaries (K. Thorne, T. Carnahan, LISA Gallery)

15. A Pulsar Timing Array (PTA) • With observations of many pulsars widely distributed on the sky can in principle detect a stochastic gravitational wave background • Gravitational waves passing over the pulsars are uncorrelated • Gravitational waves passing over Earth produce a correlated signal in the TOA residuals for all pulsars • Requires observations of ~20 MSPs over ~10 years; could give the first direct detection of gravitational waves! • A timing array can detect instabilities in terrestrial time standards – establish a pulsar timescale • Can improve knowledge of Solar system properties, e.g. masses and orbits of outer planets and asteroids Idea first discussed by Hellings & Downs (1983), Romani (1989) and Foster & Backer (1990)

16. Clock errors All pulsars have the same TOA variations: monopole signature • Solar-System ephemeris errors Dipole signature • Gravitational waves Quadrupolesignature Can separate these effects provided there is a sufficient number of widely distributed pulsars

17. Detecting a Stochastic GW Background Hellings & Downs correlation function Simulation of timing-residual correlations among 20 pulsars for a GW background from binary super-massive black holes in the cores of distant galaxies To detect the expected signal, we need ~weekly observations of ~20 MSPs over ~10 years with TOA precisions of ~100 ns for ~10 pulsars and < 1 s for the rest (Jenet et al. 2005, Hobbs et al. 2009)

18. Major Pulsar Timing Array Projects • European Pulsar Timing Array (EPTA) • Radio telescopes at Westerbork, Effelsberg, Nancay, Jodrell Bank, (Cagliari) • Normally used separately, but can be combined for more sensitivity • Timing 27 millisecond pulsars, 5 with sToA< 2 ms, data spans 5 - 18 years • North American pulsar timing array (NANOGrav) • Data from Arecibo and Green Bank Telescope • Timing 17 millisecond pulsars, 16 with sToA < 2 ms, data spans ~ 5 years • Parkes Pulsar Timing Array (PPTA) • Data from Parkes 64m radio telescope in Australia • Timing 22 millisecond pulsars, 16 with sToA < 2 ms, data spans 3 – 19 years Observations at two or three frequencies required to remove the effects of interstellar dispersion

19. The Parkes Pulsar Timing Array Collaboration • CSIRO Astronomy and Space Science, Sydney Dick Manchester, George Hobbs, Ryan Shannon, Mike Keith, Sarah Burke-Spolaor, Aidan Hotan, John Sarkissian, John Reynolds, Mike Kesteven, Warwick Wilson, Grant Hampson, Andrew Brown, (Jonathan Khoo), (Russell Edwards) • Swinburne University of Technology, Melbourne Matthew Bailes, Willem van Straten,Andrew Jameson, (Stefan Oslowski) • Monash University, Melbourne • Yuri Levin • University of Melbourne • Vikram Ravi(Stuart Wyithe) • University of Western Australia, Perth • Linqing Wen, Xingjiang Zhu • Curtin University, Perth • Ramesh Bhat • University of California, San Diego Bill Coles • MPIfR, Bonn (David Champion), (JorisVerbiest), (KJ Lee) • National Space Science Center, Beijing • Xinping Deng • Xinjiang Astronomical Observatory, Urumqi • Jingbo Wang • Southwest University, Chongqing XiaopengYou

20. The PPTA Project • Using the Parkes 64-m radio telescope at three frequencies, 700 MHz, 1400 MHz and 3100 MHz, to observe 21 MSPs • Observations at 2 - 3 week intervals • Regular observations commenced in mid-2004 • Digital filterbanks and baseband recording systems used to remove dispersive delays • Database and processing pipeline - PSRCHIVE programs • Timing analysis - TEMPO2 • Studying detection algorithms for different types of GW sources (stochastic background, individual SMBHB, GW burst sources, etc.) • Simulating GW signals and studying implications for galaxy evolution models • Establishing a pulsar-based timescale and investigating Solar system properties • Using PPTA data sets to investigate individual pulsar properties, e.g., pulse polarisation, binary evolution, astrometry etc. Manchester et al. (2013)www.atnf.csiro.au/research/pulsar/ppta

21. The PPTA Pulsars All (published) MSPs not in globular clusters

22. PPTA Three-band Timing Residuals 50cm 10cm 20cm

23. PPTA Data Sets • Data for 22 pulsars, currently timing 21, two started 3 years ago • PPTA data + earlier Parkes data – spans up to 19 years • Best 1-year rms timing residuals ~40 ns (J0437-4715, J1909-3744) • DM correction is important • About half of the sample shows evidence for red noise • Rms timing residuals 0.2 – 4 ms • Not yet applied: full polarisation (MTM) fitting, frequency-dependant templates Still work to do! (Hobbs 2013)

24. PPTA Timing Residuals • Timing data for 22 pulsars • Data spans to 19 years • DM corrections applied where available • Low-frequency (red) variations significant in about half of sample – some due to uncorrected DM variations in early data • Several of best-timing pulsars nearly white

25. The International Pulsar Timing Array • The IPTA is a consortium of consortia, namely existing PTAs from around the world • Currently three members: EPTA, NANOGrav and PPTA • The aims of the IPTA are to facilitate collaboration between participating PTA groups and to promote progress toward PTA scientific goals • There is a Steering Committee which sets policy guidelines for data sharing, publication of results etc. • The IPTA organises annual Student Workshops and Science Meetings – 2013 meetings will be in Krabi, Thailand, June 17-28 • The IPTA has organisedData Challenges for verification of GW detection algorithms

26. IPTA Website: www.ipta4gw.org

27. IPTA Data Challenge 1 • Three types of data set (uniform sampling, white noise; non-uniform sampling, white noise; non-uniform sampling, red+white noise) • All data sets have 5-year span • Open Challenge: details of injected GW signal given. • Closed Challenge: blind detection • Data Challenge 2 planned – will have more realistic data sets and weaker injected GW signal Results for Closed Challenge, Data set 3: Organised by Rick Jenet, KJ Lee and Mike Keith

28. IPTA Data Sets: 39 MSPs

29. Detection of the GW Background • Pulsar timing arrays are most sensitive to GW signals with frequency f ~ 1/Tspan~ few nanoHertz • Strongest source of nHz GW waves is background from orbiting super-massive black holes in distant galaxies • Number of mergers per comoving volume based on model for galaxy evolution (e.g. Millennium simulation) plus model for formation and evolution of SMBH in galaxies (M = binary chirp mass, q = mass ratio) (Phinney 2001; Jenet et al. 2006; Sesana 2013)

30. Stochastic GW Background: Distribution of SMBBH • Most of background from SMBBH in galaxies at z = 1-2 • Biggest contribution from largest BH masses: 108 – 109Msun Chirp mass = (M1M2)3/5 (M1 + M2)-1/5 (Sesana et al. 2008)

31. Predicted Stochastic GW Background Amplitude EPTA limit 20 psrs, 100 ns 10 years = hc(1/1yr) (Sesana 2013; van Haasteren et al. 2011)

32. GW Detection Sensitivity Low signal level (< white noise) High signal level (>~ w. noise) • Based on correlation analysis – Earth term only • cIJ: Hellings-Downs coefficients • Simplified model: M pulsars, all same s (rms timing noise) • At low signal levels, S/N improves as MTb ~ MT13/3 • At higher signal levels, S/N ~ MT1/2 (Siemens et al. 2013)

33. Single Sources • Likely that many SMBH binary systems are highly eccentric • GW spectrum may be dominated by a strong individual source First GW detection by PTAs could be a single source with period <~ 1 year! (Sesana 2012)

34. Localisation of GW Sources (Tempo2) • Fits quadrupolar signature to arbitrary waveforms for multiple pulsars – good for continuous or burst sources • Strong GW source injected into PPTA data sets • Grid search over sky to measure detection significance as function of position • “Blind” search: independent software for injection and detection Source detected at close to correct position (George Hobbs and Ryan Shannon)

35. Limiting the GW Background • Can use auto-correlations –pulsar terms contribute power to ACF • Detection statistic: Weights: Spectral model: GW signal: Expected signal for A95 • Used six best PPTA pulsars (fPPTA=2.8 nHz) • 95% confidence limit on GW signal in data: Observed spectrum M W Fitted GW signal (A=1.2x10-15) A95< 2.4 x 10-15 Rel. energy density WGW(fPPTA) < 1.3 x 10-9 (Shannon et al. 2013)

36. Current PPTA Limit (95% confidence) Ravi et al. 2012 (Millennium model with new BH mass function) Sesana 2013 McWilliams et al. 2012 A95 = 2.4 x 10-15 (Shannon et al. 2013)

37. Predicted Stochastic GW Background Amplitude EPTA limit 20 psrs, 100 ns 10 years PPTA limit = hc(1/1yr) (Sesana 2013, van Haasteren et al. 2011; Shannon et al. 2013)

38. Future Prospects • Continuing searches will increase number of known pulsars • Combination of extended PTA data sets to make IPTA should give a detection of the stochastic GW background (M ~ 35) • Very high sensitivity of FAST and SKA should allow timing of 100 – 200 MSPs Sensitivity of a PTA to a stochastic GW background 100 ns rms residuals No intrinsic red noise Black: 20 psrs Red: 50 psrs Blue: 200 psrs Plain line: 5 yrs Line with ×: 10 yrs Line with o: 20 yrs (Sesana prediction) (Manchester et al. 2012)

39. FAST: Guizhou China 2017 2012 2020+ SKA Mid-Frequency Array: South Africa

40. The Gravitational Wave Spectrum