Dirac manifold in nLab
Context
∞\infty-Lie theory
∞-Lie theory (higher geometry)
Background
Smooth structure
Higher groupoids
Lie theory
∞-Lie groupoids
∞-Lie algebroids
Formal Lie groupoids
Cohomology
Homotopy
Related topics
Examples
∞\infty-Lie groupoids
∞\infty-Lie groups
∞\infty-Lie algebroids
∞\infty-Lie algebras
Symplectic geometry
Background
Basic concepts
Classical mechanics and quantization
Contents
Idea
A Dirac manifold is a smooth manifold with a Dirac structure in the sense of (Courant 90).
(Beware that sometimes “Dirac structure” is used for Dirac brackets in earlier contexts which are related but not formalized in this way.)
An almost Dirac structure on a manifold XX is a subbundle L⊂TX⊕T *XL\subset T X \oplus T^*X of the tangent Courant algebroid, which is isotropic under a certain symmetric pairing. An almost Dirac structure is a Dirac structure if it satisfies an integrability condition.
Properties
Relation to Lagrangian dg-submanifolds
A Courant Lie 2-algebroid is a symplectic Lie n-algebroid for n=2n = 2. Dirac structures are related to the Lagrangian dg-submanifolds (see there) of the dg-manifold formally dual to its Chevalley-Eilenberg algebra.
Relation to D-branes
With suitable identifications Dirac structures characterize D-branes. This is argued generally in (Asakawa-Sasa-Watamura), and later in (Demulder & Raml 22).
An example is the canonical Cartan-Dirac structure on a Lie group, which yields the conjugacy classes of the Lie group as leaves. These are indeed known to be the D-branes of the WZW model on that Lie group.
Examples
References
General
The original articles are
-
Ted Courant, Alan Weinstein, Beyond Poisson structures, preprint, Berkeley 1986 pdf
-
Irene Dorfman, Dirac structures of integrable evolution equations, Phys. Lett. A 125 (1987), no. 5, 240–246 doi MR89b:58088
-
Ted Courant, Dirac manifolds, Trans. Amer. Math. Soc. 319 (1990), no. 2, 631–661 MR90m:58065 doi; Tangent Dirac structures, J. Phys. A 23 (1990), no. 22, 5153–5168 MR92d:58064 iop
- Irene Dorfman, Dirac structures and integrability of non-linear evolution equations, John Wiley and sons, 1993. xii+176 pp. MR94j:58081
Lecture notes include section 2 of
- Henrique Bursztyn, Alan Weinstein, Poisson geometry and Morita equivalence (arXiv:0402347)
The generalization of Dirac structures from base manifolds to base Lie groupoids (“multiplicative Dirac structure”) is discussed in
- Cristian Ortiz, Multiplicative Dirac structures (arXiv:1212.0176)
Further references include
- Anton Alekseev, Eric Meinrenken, Dirac structures and Dixmier-Douady bundles, Int. Math. Res. Not. IMRN 2012, no. 4, 904–956. MR2889163
Relation to D-branes
Relating Dirac structures to D-branes:
-
Tsuguhiko Asakawa, Shuhei Sasa, Satoshi Watamura, D-branes in Generalized Geometry and Dirac-Born-Infeld Action [arXiv:1206.6964]
-
Saskia Demulder, Thomas Raml. Poisson-Lie T-duality defects and target space fusion (2022). (arXiv:2208.04662).
Related observations for D-branes in the WZW model had long been made (unpublished) for the Cartan-Dirac structure over a Lie group.
Last revised on August 4, 2024 at 00:50:36. See the history of this page for a list of all contributions to it.