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AdS/CFT Correspondence in Heavy Ion Collisions

This article explores the problem of isotropization in heavy ion collisions and investigates if Bjorken hydrodynamics can result from a collision in the AdS/CFT framework. It discusses AdS/CFT techniques, colliding shock waves in AdS, collisions at large coupling, and mimicking small-coupling effects.

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AdS/CFT Correspondence in Heavy Ion Collisions

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  1. AdS/CFT Correspondence in Heavy Ion Collisions Yuri Kovchegov The Ohio State University Based on the work done with Javier Albacete and Anastasios Taliotis, arXiv:0805.2927 [hep-th], arXiv:0705.1234 [hep-ph]

  2. Outline • Problem of isotropization/thermalization in heavy ion collisions: can Bjorken hydrodynamics result from a heavy ion collision? • AdS/CFT techniques • Bjorken hydrodynamics in AdS • Colliding shock waves in AdS: • Collisions at large coupling: complete nuclear stopping • Mimicking small-coupling effects: unphysical shock waves

  3. The problem of isotropization in heavy ion collisions

  4. Notations We’ll be using the following notations: proper time and rapidity QGP? CGC

  5. Most General Rapidity-Independent Energy-Momentum Tensor The most general rapidity-independent energy-momentum tensor for a high energy collision of two very large nuclei is (at x3 =0) which, due to gives

  6. Color Glass at Very Early Times (Lappi ’06 Fukushima ‘07) In CGC at very early times we get, at the leading log level, such that, since Energy-momentum tensor is

  7. Color Glass at Later Times: “Free Streaming” Free streaming is characterized by the following “2d” energy-momentum tensor: such that and • The total energy E~ e t is conserved, as expected for • non-interacting particles.

  8. Classical Fields from numerical simulations by Krasnitz, Nara, Venugopalan ‘01 • CGC classical gluon field leads to energy density scaling as

  9. Much Later Times: Bjorken Hydrodynamics In the case of ideal hydrodynamics, the energy-momentum tensor is symmetric in all three spatial directions (isotropization): such that Using the ideal gas equation of state, , yields Bjorken, ‘83 • The total energy E~ e t is not conserved, while the total entropy S is conserved.

  10. If then, as , one gets . Rapidity-Independent Energy-Momentum Tensor Deviations from the scaling of energy density, like are due to longitudinal pressure , which does work in the longitudinal direction modifying the energy density scaling with tau. • Positive longitudinal pressure and isotropization ↔ deviations from

  11. The Problem • Can one show in an analytic calculation that the energy-momentum tensor of the medium produced in heavy ion collisions is isotropic over a parametrically long time? • That is, can one start from a collision of two nuclei and obtain Bjorken hydrodynamics? • Even in some idealized scenario? Like ultrarelativistic nuclei of infinite transverse extent?

  12. Perturbative take on the problem • Classical fields in CGC give (free streaming) – makes sense, as to define a diagram and S-matrix one needs an asymptotic state of free particles. • Can quantum corrections change this to ? • I do not believe so: one can show that quantum corrections give 1/t scaling order-by order (Yu.K. ‘05):

  13. Perturbative take on the problem • If quantum corrections change one power into another, one normally sees that order-by-order in perturbation theory. Here’s a couple of examples: • The small-x BFKL evolution: • Perturbative Debye screening at finite-T: with • Nothing of this sort happens for the energy density:

  14. Perturbative thermalization? • Perturbation theory does not seem to give us isotropization in heavy ion collisions. • Is thermalization possible at all? Bjorken hydro describes RHIC data rather well… • Let’s try a strongly coupled (non-perturbative) approach – maybe it will work? • The only suitable analytic technique is the use of anti-de Sitter / conformal field theory (AdS/CFT) correspondence. Additional supersymmetric particles are not likely to matter for bulk properties of the medium.

  15. AdS/CFT techniques

  16. AdS/CFT Approach z=0 Our 4d world 5d (super) gravity lives here in the AdS space 5th dimension AdS5 space – a 5-dim space with a cosmological constant L= -6/L2. (L is the radius of the AdS space.) z

  17. AdS/CFT Correspondence (Gauge-Gravity Duality) Large-Nc, large l=g2 Nc N=4 SYM theory in our 4 space-time dimensions Weakly coupled supergravity in 5d anti-de Sitter space! • Can solve Einstein equations of supergravity in 5d to learn about energy-momentum tensor in our 4d world in the limit of strong coupling! • Can calculate Wilson loops by extremizing string configurations. • Can calculate e.v.’s of operators, correlators, etc.

  18. Holographic renormalization de Haro, Skenderis, Solodukhin ‘00 • Energy-momentum tensor is dual to the metric in AdS. Using Fefferman-Graham coordinates one can write the metric as with z the 5th dimension variable and the 4d metric. • Expand near the boundary of the AdS space: • For Minkowski world and with

  19. Single Nucleus in AdS/CFT An ultrarelativistic nucleus is a shock wave in 4d with the energy-momentum tensor

  20. Shock wave in AdS Need the metric dual to a shock wave and solving Einstein equations The metric of a shock wave in AdS corresponding to the ultrarelativistic nucleus in 4d is (note that T_ _ can be any function of x^-): Janik, Peschanksi ‘05

  21. Diagrammatic interpretation The metric of a shock wave in AdS corresponding to the ultrarelativistic nucleus in 4d can be represented as a graviton exchange between the boundary of the AdS space and the bulk: cf. classical Yang-Mills field of a single ultrarelativistic nucleus in CGC in covariant gauge: given by 1-gluon exchange (Jalilian-Marian, Kovner, McLerran, Weigert ’96, Yu.K. ’96)

  22. Bjorken Hydrodynamics in AdS

  23. Asymptotic geometry • Janik and Peschanski ’05 showed that in the rapidity-independent case the geometry of AdS space at late proper times t is given by the following metricwith e0 a constant. • In 4d gauge theory this gives Bjorken hydrodynamics: with

  24. Bjorken hydrodynamics in AdS • Looks like a proof of thermalization at large coupling. • It almost is: however, one needs to first understand what initial conditions lead to this Bjorken hydrodynamics. • Is it a heavy ion collision which leads to such asymptotics? If yes, is the initial energy-momentum tensor similar to that in CGC? Or does one need some pre-cooked isotropic initial conditions to obtain Janik and Peschanski’s late-time asymptotics?

  25. Colliding shock waves in AdS

  26. Model of heavy ion collisions in AdS • Imagine a collision of two shock waves in AdS: • We know the metric of bothshock waves, and know thatnothing happens before the collision. • Need to find a metric in theforward light cone! (cf. classical fields in CGC) ? empty AdS5 1-graviton part higher order graviton exchanges

  27. Heavy ion collisions in AdS empty AdS5 1-graviton part higher order graviton exchanges

  28. Expansion Parameter • Depends on the exact form of the energy-momentum tensor of the colliding shock waves. • For the parameter in 4d is m t3 :the expansion is good for early times t only. • For that we will also considerthe expansion parameter in 4d is L2t2. Also valid for early times only. • In the bulk the expansion is valid at small-z by the same token.

  29. What to expect • There is one important constraint of non-negativity of energy density. It can be derived by requiring thatfor any time-like tm. • This gives (in rapidity-independent case)along with Janik, Peschanksi ‘05

  30. Physical shock waves • Delta-functions are unwieldy. We will smear the shock wave: • Here and with L a typical transverse momentum scale. • Solving Einstein equations we read off the resulting metric the energy density: cf. Grumiller, Romatschke, ‘08

  31. Physical shock waves • Energy density at mid-rapidity grows with time!? This violates condition. This means in some frames energy density at some rapidity is negative! • How is this possible?Look at the energy-momentum tensor of a nucleus after collision: • Looks like by the light-cone timethe nucleus will run out of momentum and stop! • Higher order corrections (graviton exchanges) would prevent energy density from going negative…

  32. Physical shock waves • We conclude that describing the whole collision in the strong coupling framework leads to nuclei stopping shortly after the collision. • This would not lead to Bjorken hydro. It is very likely to lead to spherically-symmetric Landau hydro. • While Landau hydro is possible, it is Bjorken hydro which describes RHIC data rather well. Also baryon stopping data contradicts the conclusion of nuclear stopping at RHIC. • What do we do? We know that the initial stages of the collisions are weakly coupled (CGC)!

  33. Unphysical shock waves • One can show that the conclusion about nuclear stopping holds for any energy-momentum tensor of the nuclei such that • To mimic weak coupling effects in the gravity dual we propose using an unphysical shock waves with not positive-definite energy-momentum tensor:

  34. Unphysical shock waves • Namely we take • This gives: • Almost like CGC at early times: • Energy density is now non-negative everywhere in the forward light cone! • The system may lead to Bjorken hydro. cf. Yu.K., Taliotis ‘07

  35. Will this lead to Bjorken hydro? • Not clear at this point. But if yes, the transition may look like this: (our work) Janik, Peschanski ‘05

  36. Isotropization time • One can estimate this isotropization time from AdS/CFT (Yu.K, Taliotis ‘07) obtainingwhere e0 is the coefficient in Bjorken energy-scaling: • For central Au+Au collisions at RHIC at hydrodynamics requires e=15 GeV/fm3 at t=0.6 fm/c (Heinz, Kolb ‘03), giving e0=38 fm-8/3. This leads toin good agreement with hydrodynamics!

  37. Landau vs Bjorken Bjorken hydro: describes RHIC data well. The picture of nuclei going through each other almost without stopping agrees with our perturbative/CGC understanding of collisions. Can we obtain it analytically? Landau hydro: results from strong coupling dynamics at all times in the collision. While possible, contradicts baryon stopping data at RHIC.

  38. Backup Slides

  39. Notation: Viscous Hydro example Non-equilibrium viscosity corrections give the energy-momentum tensor: Danielewicz Gyulassy ‘85 p p p3

  40. CGC: LO Calculation p t e t /2 QS t p3 t After initial oscillations one obtains zero longitudinal pressure with e = 2 p for the transverse pressure. At late times, , one gets

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