Mirror symmetry for o(k)⊕o(−2−k) → p1 for k ≥ 1. Contact toric manifolds are the odd dimensional. We define an equivariant lagrangian floer theory for lagrangian torus fibers in a compact symplectic toric manifold equipped with a subtorus action.
PPT Immanuel Kant (17241804) PowerPoint Presentation ID6855633
Theorem 1.3 makes a correspondence. In [15], mirror symmetry for toric fano manifolds was used as a testing ground to see how useful berwise fourier{type transforms, or syz transforms, could be in the investigation of the. We show that the set of all.
We also describe related methods for dealing.
The use of the legendre transform to study toric manifolds is rooted in the work of guillemin. We develop techniques for computing the equivariant local mirror symmetry of curves, i.e. Moreover we show that the legendre transform has the remarkable property of transforming. We describe the applications of localization methods, in particular the functorial localization formula, in the proofs of several conjectures from string theory.
