Proceedings ArticleDOI
Sasaki-Ricci flow on five-dimensional Sasaki-Einstein space T1,1
Mihai Visinescu
- Vol. 2218, Iss: 1, pp 050001
Reads0
Chats0
TLDR
In this article, the transverse Kahler structure of the Sasaki-Einstein space T 1,1 is investigated and new families of metrics as solutions of the SRSF equation on the five-dimensional Sasaki Einstein space are presented.Abstract:
Within the scope of Sasaki-Ricci flow we investigate the transverse Kahler structure of the Sasaki-Einstein space T1,1. We consider deformations of the Sasaki structure modifying the contact form but preserving the Reeb vector field. We produce new families of metrics as solutions of the Sasaki-Ricci flow equation on the five-dimensional Sasaki-Einstein space T1,1.Within the scope of Sasaki-Ricci flow we investigate the transverse Kahler structure of the Sasaki-Einstein space T1,1. We consider deformations of the Sasaki structure modifying the contact form but preserving the Reeb vector field. We produce new families of metrics as solutions of the Sasaki-Ricci flow equation on the five-dimensional Sasaki-Einstein space T1,1.read more
References
More filters
Journal ArticleDOI
Three-manifolds with positive Ricci curvature
Journal ArticleDOI
Superconformal field theory on threebranes at a Calabi-Yau singularity
Igor R. Klebanov,Edward Witten +1 more
TL;DR: In this paper, it was shown that string theory on AdS5 × X5 can be described by a certain N = 1 supersymmetric gauge theory, which we describe in detail.
Journal ArticleDOI
Comments on Conifolds
Philip Candelas,Xenia de la Ossa +1 more
TL;DR: In this paper, the Ricci-flat Kahler metric is calculated in the vicinity of the nodes for the conifold, the resolution and the deformation, and it is shown that, owing to a topological obstruction, the manifold obtained as the result of independently resolving and deforming the nodes of a conifolds in general cannot be Kahler.
Journal ArticleDOI
Deformation of Kähler matrics to Kähler-Eisenstein metrics on compact Kähler manifolds.
Journal ArticleDOI
Toric Geometry, Sasaki–Einstein Manifolds and a New Infinite Class of AdS/CFT Duals
Dario Martelli,James Sparks +1 more
TL;DR: In this article, it was shown that the Lagrangian of the toric diagram for the complex cone over the first del Pezzo surface is a Kahler quotient, which is equivalent to the vacua of gauge models with charges (p,p, −p+q,−p−q), and that these can be embedded in toric diagrams for the orbifold.