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Adam Jacob : A special Lagrangian type equation for holomorphic line bundles
Consider a holomorphic line bundle L over a compact Kahler manifold. Motivated by mirror symmetry, I will define an equation on L that is the line bundle analogue of the special Lagrangian equation, which can be studied even when the base is not a Calabi-Yau manifold. I will show solutions are unique global minimizers of a positive functional. To address existence, I will introduce a line bundle analogue of the Lagrangian mean curvature flow, and prove convergence in certain cases. This is joint work with S.-T. Yau.
- Category: Number Theory
- Duration: 01:34:50
- Date: March 17, 2015 at 4:25 PM
- Views: 150
- Tags: seminar, CTMS Adventures In Theory Lectures
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