A Year At RHIC First Data, New Phenomena

1. A Year At RHICFirst Data, New Phenomena W.A. ZajcColumbia University W.A. Zajc

2. Conclusions • RHIC is a hadron collider of unprecedented versatility. • The four RHIC experiments have a broad coverage ideally suited to exploit RHIC’s potential. • RHIC and its experiments provide a superb environment for the study of QCD as a fundamental theory: • Phase transition(s) associated with • Confinement • Chiral symmetry breaking • Origin of proton spin • Initial results from RHIC show superb agreement between the experiments and indications of new phenomena W.A. Zajc

3. Standard Model

4. Probes: • ~all of the allowed hadrons that can be formed from those quarksp, K, h, r, w, p, n, K*, f, L, X, W, D, d, J/Y,… • (eventually)“non-interacting” produced photons, both real and virtualg, e+e-, m+m- Relevant Parts of SM • Players: • Quarks (u, d, s, eventually c, b) with any of three color charges (r,g,b) with gauge couplings that generate interactions via exchange of • Gluons with 8 varieties of color charge W.A. Zajc

5. QCD is not QED • QED (Abelian): • Photons have do not carry charge • Flux is not confined  1/r potential  1/r2 force • QCD (Non-Abelian): • Gluons carry charge (red, green, blue)(anti-red, anti-green, anti-blue) • Flux tubes form  potential ~ r  constant force + +… W.A. Zajc

6. Making Something from Nothing • Explore non-perturbative “vacuum” that confines color flux by melting it • Experimental method: Energetic collisions of heavy nuclei • Experimental measurements:Use probes that are • Auto-generated • Sensitive to all time/length scales • Particle production • Our ‘perturbative’ region is filled with • gluons • quark-antiquark pairs • A Quark-Gluon Plasma (QGP) W.A. Zajc

7. Why is RHIC? • To understand fundamental features of the strong interaction: • We have a theory of the strong interaction: • Where does the proton get its spin? • How does nuclear matter “melt”? (This works well except when the interaction is strong…) W.A. Zajc

8. Experimental Gauge Theory • QCD is the only fundamental gauge theory amenable to experimental study in both • Weak and strong coupling limits • Particle and bulk limits • RHIC • (Large g, bulk ) limit  heavy ion collisions • (Large g, particle) limit  spin physics • (Small g, particle) limit  W’s as helicity probes • (Small g, bulk ) limit  high pT probes of plasma state

9. NOT Here’s what RHIC (heavy ion) experiments are not : • Scattering • Rutherford, Hofstader, Kendall/Friedman/Taylor • (New) Particle Production • Positron, anti-proton, … Omega … Top … Higgs W.A. Zajc

10. Phase Diagrams Water Nuclear Matter W.A. Zajc

11. Relevant Nuclear Physics • Normal nuclei have ~ constant density: • r0 ~ 0.16 GeV / fm3 • MPROTON ~ MNEUTRON ~ 1 GeV • R(A) = 0.92 A1/3 (rms) , where A = AtomicNumber W.A. Zajc

12. Energy density for “g” massless d.o.f 8 gluons, 2 spins;  2 quark flavors, anti-quarks, 2 spins, 3 colors 37 (!) “Reasonable” estimate Relevant Thermal Physics Q. How to liberate quarks and gluons from ~1 fm confinement scale? A. Create an energy density • Need better control of dimensional analysis: W.A. Zajc

13. Pressure in plasma phase with “Bag constant” B ~ 0.2 GeV / fm3 Pressure of “pure” pion gas at temperature T Slightly More Refined Estimate • Compare • Select system with higher pressure: Phase transition at T ~ 140 MeV with latent heat ~0.8 GeV / fm3 Compare to best estimates (Karsch, QM01)from lattice calculations:T ~ 150-170 MeV latent heat ~ 0.70.3 GeV / fm3 W.A. Zajc

14. Aside 1 • Previous approach (using a “pure” pion gas) works because QCD is a theory with a mass gap { • This gap is a manifestation of the approximate SU(2)R x SU(2)Lchiral symmetry of QCD with pions as the Nambu-Goldstone bosons W.A. Zajc

15. requires T < TH Fit to this form with TH = 163 MeV Aside 2 The frightening density of hadronic levels led to concepts of • A “limiting temperature” TH (Hagedorn, 1965) • A phase transition(?) in hadronic matter before quarks were understood as underlying constituents W.A. Zajc

16. 0.66 TC T =0 0.90 TC 1.06 TC Aside 3 What lattice QCD does superbly (uniquely?): Study potential V(r) = -a/r + s ras a function of temperature T F. Karsch, hep-ph/0103314

17. g The Early Universe, Kolb and Turner Previous Attempts First attempt at QGP formation was successful (~1010 years ago) ( Effective number of degrees-of-freedom per relativistic particle ) W.A. Zajc

18. RHIC Specifications • 3.83 km circumference • Two independent rings • 120 bunches/ring • 106 ns crossing time • Capable of colliding ~any nuclear species on ~any other species • Energy: • 500 GeV for p-p • 200 GeV for Au-Au(per N-N collision) • Luminosity • Au-Au: 2 x 1026 cm-2 s-1 • p-p : 2 x 1032 cm-2 s-1(polarized) 6 3 5 1’ 4 1 2 W.A. Zajc

19. How is RHIC Different? • It’s a collider • Detector systematics independent of ECM • (No thick targets!) • It’s dedicated • Heavy ions will run 20-30 weeks/year • It’s high energy • Access to perturbative phenomena • Jets • Non-linear dE/dx • Its detectors are comprehensive • ~All final state species measured with a suite of detectors that nonetheless have significant overlap for comparisons W.A. Zajc

20. 15-20% b 10-15% 5-10% 0-5% Fixing Initial Conditions • Event characterization • Impact parameter b is well-defined in heavy ion collisions • Event multiplicity predominantly determined by collision geometry • Characterize this by global measures of multiplicity and/or transverse energycorrelated with ZDC  Zero Degree Calorimeter • Goals: • Uniform luminosity monitoring at all 4 intersections • Uniform event characterization by all 4 experiments • Process: • Correlated Forward-Backward Dissociation • stot = 11.0 Barns (+/- few %) W.A. Zajc

21. Run-1 Results • RHIC worked (i.e, achieved its Year-1 goals): • Stable operation at 130 GeV • Delivery of 10% of design luminosity • All four experiments worked • All four experiments produced quality data within a few months of initial RHIC operation • Particle yields • Rapidity and pT spectra • Flow • Source sizes (Etc.) • This from a data set equivalent to 1-3 days running of RHIC at design luminosity W.A. Zajc

22. STAR RHIC’s Experiments W.A. Zajc

23. 2. Initial State Role of event geometry and gluon distributions • Final State • Yields of produced particles • Thermalization, Hadrochemistry 3. Plasma(?) Probes of dense matter Outline Will present sample of results from various points of the collision process: W.A. Zajc

24. Kinematics Dynamics Kinematics 101 Fundamental single-particle observable: Momentum Spectrum W.A. Zajc

25. BRAHMS Acceptance (PID) Acceptances PHOBOS Acceptance STAR Acceptance W.A. Zajc

26. STAR Event Data Taken June 25, 2000. Pictures from Level 3 online display. W.A. Zajc

27. STAR W.A. Zajc

28. Results on Particle Composition Anti-particle/particle ratios from PHOBOS and BRAHMS mid-rapidity Anti-particle, particle spectra from PHENIX and STAR W.A. Zajc

29. Agreement between Experiments • Excellent agreement in common observables provides confidence • Overlaps in detector capabilities a feature of RHIC program W.A. Zajc

30. BRAHMS An experiment with an emphasis: • Quality PID spectra over a broad range of rapidity and pT • Special emphasis: • Where do the baryons go? • How is directed energy transferred to the reaction products? • Two magnetic dipole spectrometers in “classic” fixed-target configuration W.A. Zajc

31. Baryon number, found(?) at non-zero rapidities, must be measured away from 90 degrees • Enter BRAHMS Where do the Baryons Go? • There is a (not-quite-perfect) correspondence between longitudinal momentum (rapidity) and the angle of emission in the center-of-mass W.A. Zajc

32. BRAHMS Results • Anti-proton to proton yields as a function of rapidity: (Two points are reflected about y=0) • Clear evidence for development of (nearly) baryon-free central region W.A. Zajc

33. √s [GeV] Approaching the Early Universe • Early Universe: • Anti-proton/proton = 0.999999999 • We’ve created “pure” matterapproaching this value pbar/p • For the first timein heavy ion collisions, more baryons are pair-produced than brought in from initial state NA44 Pb+Pb E866 Au+Au W.A. Zajc

34. Compilation and Figure from M. Kaneta 130 GeV RHIC : STAR / PHENIX / PHOBOS /BRAHMS 17.4 GeV SPS : NA44, WA97 Simple Chemistry • Assume • chemical description appropriate  (m,T) • Boltzmann approximation valid  n(m,T) ~ e m / T • Feed down negligible  use “raw” ratios • Then W.A. Zajc

35. Final-state analysis suggests RHIC reaches the phase boundary • Difficult for hadrons to probe earlier than this “freeze-out” • <E>/N ~ 1 GeV(J. Cleymans and K. Redlich,Phys.Rev.C60:054908,1999 ) Locating RHIC on Phase Diagram • Baryon ratios determine m / T • K/p ratio, momentum spectra determine T • TCH = 190 ± 20 MeV, B = 45 ± 15 MeV (M. Kaneta and N. Xu, nucl-ex/0104021) W.A. Zajc

36. t Dynamics 101 Q. How to estimate initial energy density? A. From rapidity density • “Highly relativistic nucleus-nucleus collisions: The central rapidity region”, J.D. Bjorken, Phys. Rev. D27, 140 (1983). • Assumes • ~ 1-d hydrodynamic expansion • Invariance in y along “central rapidity plateau”(I.e., flat rapidity distribution) • Then since boost-invariance of matter  where t ~ 1 fm/c W.A. Zajc

37. Determining Energy Density EMCAL • What is the energy density achieved? • How does it compare to the expected phase transition value ? PHENIX For the most central events: Bjorken formula for thermalized energy density time to thermalize the system (t0 ~ 1 fm/c) ~6.5 fm eBjorken~ 4.6 GeV/fm3 pR2 ~30 times normal nuclear density ~1.5 to 2 times higher than any previous experiments W.A. Zajc

38. Generally: requires number density at temperature T to exceed ~1 per “de Broglie volume” l3 • Non-relativistic: • Relativistic:(i.e., number and energy densities approach blackbody values) (Bose-Einstein) Condensates(?!?) • Note that Bose condensation • Does not require low temperature • Does require high phase space densities • Any realistic estimate of RHIC densities • Significantly (x10-100) in excess of these values • Quantum, condensate effects may be important • But -- effects in highly dynamic, interacting system difficult to quantify W.A. Zajc

39. z Hydrodynamic limit STAR: PRL86 (2001) 402 PHOBOS preliminary (scaled) spatial asymmetry y x (PHOBOS : Normalized Paddle Signal) Compilation and Figure from M. Kaneta Centrality Dependence of Elliptic Flow Parameterize azimuthal asymmetry of charged particlesas 1 + 2 v2cos (2 f) Evidence that initial spatial asymmetry is efficiently translated to momentum space ( as per a hydrodynamic description) W.A. Zajc

40. PHOBOS An experiment with a philosophy: • Global phenomena • large spatial sizes • small momenta • Minimize the number of technologies: • All Si-strip tracking • Si multiplicity detection • PMT-based TOF • Unbiased global look at very large number of collisions (~109) W.A. Zajc

41. ~2A PHOBOS Result on dNch/dh Q. How many charged particles per nucleon-nucleon collision? A: Express using • dNch/dh ~ “generic” dNch/dy • Npart  Number of participating nucleons = 2 for p-p collision ~2A for central A-A collision • Plot multiplicity per N-N collision ( dNch/dh ) / ( Npart/2 ) • Does not (quite) distinguish between • “Saturation” models, dominated by gg g • “Cascade” models, dominated by gg gg, gg ggq ( X.N. Wang and M. Gyulassy, nucl-th/0008014 ) W.A. Zajc

42. PHENIX W.A. Zajc

43. PHENIX Results • Excellent consistency between two analyses • Yields grow significantly faster than Nparticipants • Evidence for term ~ Ncollisions • Qualitatively consistent with HIJING • Inconsistent with some saturation models Evidence for highest energy densities yet achieved (~ 5 GeV/fm3) W.A. Zajc

44. dN/dh / .5Npart Npart Physics, Consistency between Experiments • Trend • incompatible with final-state gluon saturation model • Good agreement with model based on initial-state saturation (Kharzeev and Nardi, nucl-th/0012025) • Excellent agreement between (non-trivial) PHENIX and PHOBOS analyses of this systematic variation with nuclear overlap. W.A. Zajc

45. Gluon saturation at RHIC / xpz 2R dT =  /Q 2R m/pz Longitudinal Transverse When do the gluons overlap significantly? 1 J.P Blaizot, A.H. Mueller, Nucl. Phys. B289, 847 (1987) So for  /mx ~ 2R , ~ all constituents contributeParton density r ~ A xG(x,Q2) /R2 Parton cross section s ~ aS2/ Q2 Saturation condition rs ~ 1 QS2 ~ aS A xG(x,Q2) /R2 ~ A1/3 D. Kharzeev, nucl-th/0107033 W.A. Zajc

46. Initial State Partons? • Procedure: • Determine scale QS2 as function of nuclear overlap • QS2 ~ A1/3 ~ Npart1/3 • Assume final-state multiplicities proportional to number of initial-state gluons in this saturated regime: • dN/dh = c Npart xG(x, QS2) • Note that DGLAP requires evolution of xG(x, QS2) : • xG(x, QS2) ~ ln (QS2 / LQCD2) • Results: • “Running” of the multiplicity yielddirectly from from xG(x, Q2) +DGLAP W.A. Zajc

47. pp Extensions of Saturation Approach* • Use HERA data, counting rules • x G(x,Q2) ~ x-l (1-x)4 • Describe rapidity dependence: • y ~ ln(1/x)  QS2(s,y) = QS2(s,y=0)ely • Predict energy dependence: • x = QS / s QS2(s,y) = QS2(s0,y) (s/s0) l/2 • Predict10-14% increase betweens = 130 and 200 GeV • Versus 146% reported by PHOBOS * D. Kharzeev and E. Levin, nucl-th/0108006 W.A. Zajc

48. Energy Loss of Fast Partons • Many approaches • 1983: Bjorken • 1991: Thoma and Gyulassy (1991) • 1993: Brodsky and Hoyer (1993) • 1997: BDMPS- depends on path length(!) • 1998: BDMS • Numerical values range from • ~ 0.1 GeV / fm (Bjorken, elastic scattering of partons) • ~several GeV / fm (BDMPS, non-linear interactions of gluons) W.A. Zajc

49. Rare processes at RHIC Both PHENIX and STAR have measured charged particle spectra out to “small” cross sections W.A. Zajc

50. Expectations • Particle production via rare processes should scale with Ncoll, the number of underlying binary nucleon-nucleon collisions • Assuming no “collective” effects • Test this on production at high transverse momentum W.A. Zajc