# Deformations of Courant Algebroids and Dirac Structures via Blended   Structures

**Authors:** Xiang Ji

arXiv: 1704.03111 · 2017-04-12

## TL;DR

This paper develops a unified framework for deforming Courant algebroids, Dirac structures, and related geometric objects by allowing the pseudo-Euclidean metric to vary, using blended algebraic structures and graded Q-manifolds.

## Contribution

It introduces blended DGLA and L_-algebra structures to control deformations, extending existing theories to include metric deformations and unifying various geometric deformations.

## Key findings

- Deformations are governed by blended DGLA and L_-algebra structures.
- Unified approach applies to Courant algebroids, Poisson manifolds, and Lie algebroids.
- Allows metric deformations alongside structural deformations.

## Abstract

Deformations of a Courant Algebroid E and its Dirac subbundle A have been widely considered under the assumption that the pseudo-Euclidean metric is fixed. In this paper, we attack the same problem in a setting that allows the pseudo-Euclidean metric to deform. Thanks to Roytenberg, a Courant algebroid is equivalent to a symplectic graded Q-manifold of degree 2. From this viewpoint, we extend the notions of graded Q-manifold, DGLA and L_\infty-algebra all to "blended" version so that Poisson manifold, Lie algebroid and Courant algebroid are unified as blended Q-manifolds; and define a submaniold A of "coisotropic type" which naturally generalizes the concepts of coisotropic submanifolds, Lie subalgebroids and Dirac subbundles. It turns out the deformations a blended homological vector field Q is controlled by a blended DGLA, and the deformations of A is controlled by a blended L_\infty-algebra. The results apply to the deformations of a Courant algebroid and its Dirac structures, the deformations of a Poisson manifold and its coisotropic submanifold, the deformations of a Lie algebroid and its Lie subalgebroid.

## Full text

_Full body text omitted from this summary view._ Fetch the complete paper as Markdown: https://tomesphere.com/paper/1704.03111/full.md

## References

18 references — full list in the complete paper: https://tomesphere.com/paper/1704.03111/full.md

---
Source: https://tomesphere.com/paper/1704.03111