English

Differential calculus for generalized geometry and geometric Lax flows

Differential Geometry 2024-10-09 v2

Abstract

Employing a class of generalized connections, we describe certain differential complices (Ω~T(M),d~T)\left(\tilde \Omega^*_{\mathbb{T}}(M), \tilde{\mathbb{d}}^{\mathbb{T}}\right) constructed from TM\wedge^* \mathbb{T} M and study some of their basic properties, where TM=TMTM\mathbb{T} M = T M \oplus T^*M is the generalized tangent bundle on MM. A number of classical geometric notions are extended to TM\mathbb{T} M, such as the curvature tensor for a generalized connection. In particular, we describe an analogue to the Levi-Civita connection when TM\mathbb{T} M is endowed with a generalized metric and a structure of exact Courant algebroid. We further describe in generalized geometry the analogues to the Chern-Weil homomorphism, a Weitzenb\"ock identity, the Ricci flow and Ricci soliton, the Hermitian-Einstein equation and the degree of a holomorphic vector bundle. Furthermore, the Ricci flows are put into the context of geometric Lax flows, which may be of independent interest.

Keywords

Cite

@article{arxiv.2206.04566,
  title  = {Differential calculus for generalized geometry and geometric Lax flows},
  author = {Shengda Hu},
  journal= {arXiv preprint arXiv:2206.04566},
  year   = {2024}
}

Comments

48 pages. Typos corrected and references updated

R2 v1 2026-06-24T11:45:19.042Z