Evolution and End Point of the Black String Instability: Large D Solution.

We derive a simple set of nonlinear, (1+1)-dimensional partial differential equations that describe the dynamical evolution of black strings and branes to leading order in the expansion in the inverse of the number of dimensions D. These equations are easily solved numerically. Their solution shows that thin enough black strings are unstable to developing inhomogeneities along their length, and at late times they asymptote to stable nonuniform black strings. This proves an earlier conjecture about the end point of the instability of black strings in a large enough number of dimensions. If the initial black string is very thin, the final configuration is highly nonuniform and resembles a periodic array of localized black holes joined by short necks. We also present the equations that describe the nonlinear dynamics of anti-de Sitter black branes at large D.

[1]  Ryo Suzuki,et al.  Non-uniform black strings and the critical dimension in the 1/D expansion , 2015, 1506.01890.

[2]  Ryo Suzuki,et al.  Stationary black holes: large D analysis , 2015, 1505.01282.

[3]  Takahiro Tanaka,et al.  Effective theory of black holes in the 1/D expansion , 2015, 1504.06489.

[4]  Anandita De,et al.  A membrane paradigm at large D , 2015, 1504.06613.

[5]  R. Emparan,et al.  Quasinormal modes of (anti-)de Sitter black holes in the 1/D expansion , 2015, 1502.02820.

[6]  R. Emparan,et al.  Decoupling and non-decoupling dynamics of large D black holes , 2014, 1406.1258.

[7]  R. Emparan,et al.  Large-D gravity and low-D strings. , 2013, Physical review letters.

[8]  R. Emparan,et al.  The large D limit of General Relativity , 2013, 1302.6382.

[9]  Kostas Skenderis,et al.  AdS/Ricci-flat correspondence and the Gregory-Laflamme instability , 2012, 1211.2815.

[10]  L. Lehner,et al.  Black Holes in Higher Dimensions: Final state of Gregory–Laflamme instability , 2012 .

[11]  L. Lehner,et al.  Black strings, low viscosity fluids, and violation of cosmic censorship. , 2010, Physical review letters.

[12]  U. Miyamoto,et al.  High and low dimensions in the black hole negative mode , 2007, 0706.1555.

[13]  V. Niarchos,et al.  Instabilities of black strings and branes , 2007, hep-th/0701022.

[14]  B. Kol The phase transition between caged black holes and black strings , 2004, hep-th/0411240.

[15]  E. Sorkin Critical dimension in the black-string phase transition. , 2004, Physical review letters.

[16]  T. Wiseman Static axisymmetric vacuum solutions and non-uniform black strings , 2002, hep-th/0209051.

[17]  S. Gubser On non-uniform black branes , 2001, hep-th/0110193.

[18]  K. Maeda,et al.  Fate of the black string instability. , 2001, Physical review letters.

[19]  Gregory,et al.  Black strings and p-branes are unstable. , 1993, Physical review letters.

[20]  R.Gregory,et al.  Black Strings and p-Branes are Unstable , 1993, hep-th/9301052.