Search for Catalysis of Black Holes Formation in Hight Energy Collisions Irina Aref’eva Steklov Mathematical Institute, Moscow Kolomna, QUARKS’2010, June 6-12, 2010

Outlook Theoretical problems of BH formation: Geometrical cross-section; Trapped surface arguments; Simple calculations that support BH formation; Search for catalysis. Colliding Hadron as Cosmic Membrane

Known: BH formation in transplankian collision of particles – semiclassical process Classical geometrical cross-section Question: can we increase geometrical cross-section? Answer: IA,

BLACK HOLE FORMATION Thorn's hoop conjecture : BH forms if the linear size of clumping matter l is comparable to the Schwarzschild radius R s of a BH of mass m 1+1  BH Modified Thorn's hoop conjecture : BH forms if the impact parameter b is comparable to the Schwarzschild radius R s of a BH of mass E. Classical geometrical cross-section

BLACK HOLE FORMATION in D>4

Classical geometric cross-section Classical geometric cross-section has got support from trapped surface estimations R.Penrose, unpublished, 1974 D.M.Eardley and S.B. Giddings, 2002 H.Yoshino and Y. Nambu, 2003 S. B. Giddings and V. S. Rychkov, 2004 ………

Classical geometric cross-section Numbers ? I.Antoniadis, 1998 N. Arkani-Hamed, S. Dimopoulos, G.R. Dvali; Hierarchy problem

Micro-BH at Accelerators and Parton Structure S – the square of energy (in c.m.) are the parton momentum fractions the parton distribution functions NUMBERS are small!

Motivation : small cross-section of micro BH production at the LHC Question: what we can do to increase cross- section Answer: modify the conditions of collisions Search for Catalysis of BH Production

Search for a catalyst find effects related with nontrivial dynamics of 3-brane embedding in D-dim spacetime. Change the background (4-dim/D-dim), in particular, we can add the cosmological constant (AdS/dS) D-dim tail of 4-dim particles made from closed string excitations

Framework of a search for a catalyst D-dim gravitational model of relativistic particles D-dim gravitational model of particles on brane with “tails” in the bulk. Shock-waves as an approx. for ultrarelativistic particles. “dilaton” shock-wave

Lambda Modifications: Colliding objects - shock waves with e,s,… I.A., A.Bagrov, E.Guseva, Nastase; Gubser, Pufu, Yarom, 2008,2009; Alvarez-Gaume, Gomes, ; Shuryak , ……. With charge and Lambda: I.A., A.Bagrov, L.Joukowskaya In flat space with charge: Yoshino, Mann 06; Spin - Yoshino, Zelnikov, V.Frolov 07.

D-dim gravitational model of relativistic particles Tolman-Florides interior incompressible perfect fluid solution Static spherical symmetric solitonic solution of gravity-matter E.O.M. (boson stars) or Numerical calculations by M.Choptuik and F.Pretorius PRL, 2010 Boost  flattening of the Schwarzschild sphere

Modified Thorn's hoop conjecture : It is not obvious that the hoop conjecture is applicable. Counterexample: a single particle boosted beyond the Planck energy -- no black hole formation.

Choptuik-Pretorius results

M D with a shock wave (Aichelburg-Sexl metric) Metric of the space-time with shock wave M. Hotta, M. Tanaka – 1992 Smooth coordinates: P.D’Eath coordinates, Dray and ‘t Hooft

X Particles and Shock Waves M Z=(U+V)/2 Shock Waves 't Hooft, Kaloper, Terning

M D with a shock wave (Aichelburg-Sexl metric) Metric of the space-time with shock wave M. Hotta, M. Tanaka – 1992

X Geodesics in the space-time with shock wave V U

X Particle in Shock Wave M Z=(U+V)/2 Shock Wave M is chasing after the shock TargetProjectile

Escape or not escape M

Charged dilaton G.Gibbons, Maeda, Garfinkle, Horowitz, Strominger, Cai,… BH solutions Acts as a catalyst Shock wave

Lambda Modifications: I.A., A.Bagrov, E.Guseva, Nastase; Gubser, Pufu, Yarom, 2008,2009; Alvarez-Gaume, Gomes, ; Shuryak , …….

dS 4 space-time with a shock wave as submanifold ( ) of 5-dim. space-time with metric Metric of the space-time with shock wave M. Hotta, M. Tanaka – 1992 Hotta-Tanake, 92 Sfetsos, 95 Griffiths, Podolsky, 97 Horowitz, Itzhaki, 99 Emparan. 01

Capture in the presence of the vacuum energy Trapped surface guarantees BH formation only for asymptotical free spacetimes

Conclusion Modified Thorn’s conjecture is confirmed; Results of trapped surface calculations are confirmed Catalysts: A particular “dilaton” acts as a catalyst Lambda<0 acts as a catalyst

Colliding Hadron as Cosmic Membrane Hight-energy hadrons colliding on the 3-brane embedding in the 5-dim spacetime with 5th dim smaller than the hadrons size are considered as colliding cosmic membranes. This consideration leads to the 3-dim effective model of high energy collisions of hadrons and the model is similar to cosmic strings in the 4- dim world.

Colliding Hadron as Cosmic Membrane These membranes are located on our 3-brane. Since 5-gravity is strong enough we can expect that hadrons membranes modified the 5-dim spacetime metric. ADD RS2

Colliding Hadron as Cosmic Membrane Due to the presence of the hadron membrane the gravitational background is nontrivial and describes a flat spacetime with a conical singularity located on the hadron membrane. This picture is a generalization of the cosmo- logical string picture in the 4-dim world to the 5-dim world. The angle deficit

Colliding Hadron as Cosmic Membrane Two types of effects of the angle deficit : corrections to the graviton propagation; new channels of decays

Colliding Hadron as Cosmic Membrane Corrections to the graviton propagation; k – momentum of m particle New channels of decays Toy model: if we neglect brane, light particle m  2M