170 research outputs found
A class of identities relating Whittaker and Bessel functions
Identities between Whittaker and modified Bessel functions are derived for
particular complex orders. Certain polynomials appear in such identities, which
satisfy a fourth order differential equation (not of hypergeometric type), and
they themselves can be expressed as particular linear combinations of products
of modified Bessel and confluent hypergeometric functions.Comment: 8 pages, late
A note on the uniqueness of the Neumann matrices in the plane-wave background
In this note, we prove the uniqueness of the Neumann matrices of the
open-closed vertex in plane-wave light-cone string-field theory, first derived
for all values of the mass parameter mu in hep-th/0311231. We also prove the
existence and uniqueness of the inverse of an infinite dimensional matrix
necessary for the cubic vertex Neumann matrices, and give an explicit
expression for it in terms of mu-deformed Gamma functions. Methods of complex
analysis are used together with the analytic properties of the mu-deformed
Gamma functions. One of the implications of these results is that the
geometrical continuity conditions suffice to determine the bosonic part of the
vertices as in flat space.Comment: 10 pages, Latex, 2 references adde
Static near-horizon geometries in five dimensions
We consider the classification of static near-horizon geometries of
stationary extremal (not necessarily BPS) black hole solutions of five
dimensional Einstein-Maxwell theory coupled to a Chern-Simons term with
coupling xi (with xi=1 corresponding to supergravity). Assuming the black holes
have two rotational symmetries, we show that their near-horizon geometries are
either the direct product AdS_3 X S^2 or a warped product of AdS_2 and compact
3d space. In the AdS_2 case we are able to classify all possible near-horizon
geometries with no magnetic fields. There are two such solutions: the direct
product AdS_2 X S^3 as well as a warped product of AdS_2 and an inhomogeneous
S^3. The latter solution turns out to be near-horizon limit of an extremal
Reissner-Nordstrom black hole in an external electric field. In the AdS_2 case
with magnetic fields, we reduce the problem (in all cases) to a single
non-linear ODE. We show that if there are any purely magnetic solutions of this
kind they must have S^1 X S^2 horizon topology, and for xi^2 <1/4 we find
examples of solutions with both electric and magnetic fields.Comment: Latex, 28 pages. v2: minor changes, reference adde
All higher-dimensional Majumdar-Papapetrou black holes
We prove that the only asymptotically flat spacetimes with a suitably regular
event horizon, in a generalised Majumdar-Papapetrou class of solutions to
higher-dimensional Einstein-Maxwell theory, are the standard multi-black holes.
The proof involves a careful analysis of the near-horizon geometry and an
extension of the positive mass theorem to Riemannian manifolds with conical
singularities. This completes the classification of asymptotically flat,
static, extreme black hole solutions in this theory.Comment: 10 pages. v2: minor correction, assumption added, references added.
v3: main result stated as a theorem, published versio
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