1. If ${\displaystyle U\subset V}$  is a vector subspace, then ${\displaystyle D=U\times U^{\circ }}$  is a Dirac structure on ${\displaystyle V}$ , where ${\displaystyle U^{\circ }}$  is the annihilator of ${\displaystyle U}$ ; that is, ${\displaystyle U^{\circ }=\left\{\alpha \in V^{*}\mid \alpha _{\vert U}=0\right\}}$ .
2. Let ${\displaystyle \omega :V\to V^{*}}$  be a skew-symmetric linear map, then the graph of ${\displaystyle \omega }$  is a Dirac structure.
3. Similarly, if ${\displaystyle \Pi :V^{*}\to V}$  is a skew-symmetric linear map, then its graph is a Dirac structure.

A Dirac structure ${\displaystyle {\mathfrak {D}}}$  on a manifold M is an assignment of a (linear) Dirac structure on the tangent space to M at m, for each ${\displaystyle m\in M}$ . That is,

• for each ${\displaystyle m\in M}$ , a Dirac subspace ${\displaystyle D_{m}}$  of the space ${\displaystyle T_{m}M\times T_{m}^{*}M}$ .

Many authors, in particular in geometry rather than the mechanics applications, require a Dirac structure to satisfy an extra integrability condition as follows:

• suppose ${\displaystyle (X_{i},\alpha _{i})}$  are sections of the Dirac bundle (${\displaystyle i=1,2,3}$ ) then ${\displaystyle \left\langle L_{X_{1}}(\alpha _{2}),\,X_{3}\right\rangle +\left\langle L_{X_{2}}(\alpha _{3}),\,X_{1}\right\rangle +\left\langle L_{X_{3}}(\alpha _{1}),\,X_{2}\right\rangle =0.}$ 

In the mechanics literature this would be called a closed or integrable Dirac structure.

1. Let ${\displaystyle \Delta }$  be a smooth distribution of constant rank on a manifold M, and for each ${\displaystyle m\in M}$  let ${\displaystyle D_{m}=\{(u,\alpha )\in T_{m}M\times T_{m}^{*}M\mid u\in \Delta (m),\,\alpha \in \Delta (m)^{\circ }\}}$ , then the union of these subspaces over m forms a Dirac structure on M.
2. Let ${\displaystyle \omega }$  be a symplectic form on a manifold ${\displaystyle M}$ , then its graph is a (closed) Dirac structure. More generally this is true for any closed 2-form. If the 2-form is not closed then the resulting Dirac structure is not closed (integrable).
3. Let ${\displaystyle \Pi }$  be a Poisson structure on a manifold ${\displaystyle M}$ , then its graph is a (closed) Dirac structure.

Port-Hamiltonian systems edit

Nonholonomic constraints edit

Thermodynamics edit

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• van der Schaft, Arjan; Maschke, Bernhard M. (2002). "Hamiltonian formulation of distributed-parameter systems with boundary energy flow" (PDF). Journal of Geometry and Physics. 42 (1–2): 166–194. Bibcode:2002JGP....42..166V. doi:10.1016/S0393-0440(01)00083-3.

• Yoshimura, Hiroaki; Marsden, Jerrold E. (2006). "Dirac structures in Lagrangian mechanics. I. Implicit Lagrangian systems". Journal of Geometry and Physics. 57: 133–156. doi:10.1016/j.geomphys.2006.02.009.

• Yoshimura, Hiroaki; Marsden, Jerrold E. (2006). "Dirac structures in Lagrangian mechanics. II. Variational structures". Journal of Geometry and Physics. 57: 209–250. CiteSeerX 10.1.1.570.4792. doi:10.1016/j.geomphys.2006.02.012.