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The Geometric Dual of a-maximisation for Toric Sasaki-Einstein Manifolds | | Dario Martelli
; James Sparks
; Shing-Tung Yau
; | | Date: |
24 Mar 2005 | | Subject: | High Energy Physics - Theory; Differential Geometry | hep-th math.DG | | Abstract: | We show that the Reeb vector, and hence in particular the volume, of a Sasaki-Einstein metric on the base of a toric Calabi-Yau cone of complex dimension n may be computed by minimising a function Z on R^n which depends only on the toric data that defines the singularity. In this way one can extract certain geometric information for a toric Sasaki-Einstein manifold without finding the metric explicitly. For complex dimension n=3 the Reeb vector and the volume correspond to the R-symmetry and the a central charge of the AdS/CFT dual superconformal field theory, respectively. We therefore interpret this extremal problem as the geometric dual of a-maximisation. We illustrate our results with some examples, including the Y^{p,q} singularities and the complex cone over the second del Pezzo surface. | | Source: | arXiv, hep-th/0503183 | | Services: | Forum | Review | PDF | Favorites | |
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