Add to ORKGSupersymmetric domain-wall spacetimes that lift to Ricci-flat solutions of M-theory admit generalized Heisenberg (2-step nilpotent) isometry groups. These metrics may be obtained from known cohomogeneity one metrics of special holonomy by taking a "Heisenberg limit", based on an In\"on\"u-Wigner contraction of the isometry group. Associated with each such metric is an Einstein metric with negative cosmological constant on a solvable group manifold. We discuss the relevance of our metrics to the resolution of singularities in domain-wall spacetimes and some applications to holography. The extremely simple forms of the explicit metrics suggest that they will be useful for many other applications. We also give new but incomplete inhomogeneous ...
It is found the most general local form of the 11-dimensional supergravity backgrounds which, by red...
Suppose that M is an orientable n-dimensional manifold, and g a Riemannian metric on M. Then the hol...
Ricci flat manifolds of special holonomy are a rich framework as models of the extra dimensions in s...
We review the relations between a family of domain-wall solutions to M-theory and gravitational inst...
In the present work the Calderbank-Pedersen description of four dimensional manifolds with self-dual...
Non-compact G_2 holonomy metrics that arise from a T^2 bundle over a hyper-Kahler space are discusse...
The main results presented in this dissertation are the following - We have shown that in $d=4$ weak...
Using D2-brane probes, we study various properties of M-theory on singular, non-compact manifolds of...
We investigate the $Spin(7)$ holonomy metric of cohomogeneity one with the principal orbit $SU(3)/U(...
We construct all complete metrics of cohomogeneity one G(2) holonomy with S^3 x S^3 principal orbits...
From the introduction: In Chapter 1 we explain in detail the background that we sketched at the beg...
It was proved by Hitchin that any solution of his evolution equations for a half-flat SU (3)-structu...
Performing a Scherk-Schwarz dimensional reduction of D = 11 supergravity on a three-dimensional grou...
Non-compact G 2 holonomy metrics that arise from a T 2 bundle over a hyper-Kähler space are construc...
It is found the most general local form of the 11-dimensional supergravity backgrounds which, by red...
It is found the most general local form of the 11-dimensional supergravity backgrounds which, by red...
Suppose that M is an orientable n-dimensional manifold, and g a Riemannian metric on M. Then the hol...
Ricci flat manifolds of special holonomy are a rich framework as models of the extra dimensions in s...
We review the relations between a family of domain-wall solutions to M-theory and gravitational inst...
In the present work the Calderbank-Pedersen description of four dimensional manifolds with self-dual...
Non-compact G_2 holonomy metrics that arise from a T^2 bundle over a hyper-Kahler space are discusse...
The main results presented in this dissertation are the following - We have shown that in $d=4$ weak...
Using D2-brane probes, we study various properties of M-theory on singular, non-compact manifolds of...
We investigate the $Spin(7)$ holonomy metric of cohomogeneity one with the principal orbit $SU(3)/U(...
We construct all complete metrics of cohomogeneity one G(2) holonomy with S^3 x S^3 principal orbits...
From the introduction: In Chapter 1 we explain in detail the background that we sketched at the beg...
It was proved by Hitchin that any solution of his evolution equations for a half-flat SU (3)-structu...
Performing a Scherk-Schwarz dimensional reduction of D = 11 supergravity on a three-dimensional grou...
Non-compact G 2 holonomy metrics that arise from a T 2 bundle over a hyper-Kähler space are construc...
It is found the most general local form of the 11-dimensional supergravity backgrounds which, by red...
It is found the most general local form of the 11-dimensional supergravity backgrounds which, by red...
Suppose that M is an orientable n-dimensional manifold, and g a Riemannian metric on M. Then the hol...
Ricci flat manifolds of special holonomy are a rich framework as models of the extra dimensions in s...