# Holomorphic Lagrangian subvarieties in holomorphic symplectic manifolds   with Lagrangian fibrations and special Kahler geometry

**Authors:** Ljudmila Kamenova, Misha Verbitsky

arXiv: 1902.05497 · 2024-03-12

## TL;DR

This paper proves that certain Lagrangian subvarieties in holomorphic symplectic manifolds with Lagrangian fibrations are toric fibrations over their images, which are also equipped with special K"ahler structures, answering a question related to duality theories.

## Contribution

It establishes a classification of Lagrangian subvarieties intersecting smooth fibers in holomorphic symplectic manifolds with Lagrangian fibrations, linking them to toric fibrations and special K"ahler geometry.

## Key findings

- Lagrangian subvarieties are toric fibrations over their images.
- The images are equipped with a special K"ahler structure.
- Answers a question of N. Hitchin related to duality.

## Abstract

Let $M$ be a holomorphic symplectic K\"ahler manifold equipped with a Lagrangian fibration $\pi$ with compact fibers. The base of this manifold is equipped with a special K\"ahler structure, that is, a K\"ahler structure $(I, g, \omega)$ and a symplectic flat connection $\nabla$ such that the metric $g$ is locally the Hessian of a function. We prove that any Lagrangian subvariety $Z\subset M$ which intersects smooth fibers of $\pi$ and smoothly projects to $\pi(Z)$ is a toric fibration over its image $\pi(Z)$ in $B$, and this image is also special K\"ahler. This answers a question of N. Hitchin related to Kapustin-Witten BBB/BAA duality.

## Full text

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## References

21 references — full list in the complete paper: https://tomesphere.com/paper/1902.05497/full.md

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Source: https://tomesphere.com/paper/1902.05497