Symplectic frame bundle

In symplectic geometry, the symplectic frame bundle^[1] of a given symplectic manifold $(M,\omega )\,$ is the canonical principal ${\mathrm {Sp} }(n,{\mathbb {R} })$ -subbundle $\pi _{\mathbf {R} }\colon {\mathbf {R} }\to M\,$ of the

tangent frame bundle

\mathrm {F} M\,

consisting of linear frames which are symplectic with respect to

\omega \,

. In other words, an element of the symplectic frame bundle is a linear frame

u\in \mathrm {F} _{p}(M)\,

at point

p\in M\,,

i.e. an ordered basis

({\mathbf {e} }_{1},\dots ,{\mathbf {e} }_{n},{\mathbf {f} }_{1},\dots ,{\mathbf {f} }_{n})\,

of tangent vectors at

p\,

of the tangent vector space

T_{p}(M)\,

, satisfying

\omega _{p}({\mathbf {e} }_{j},{\mathbf {e} }_{k})=\omega _{p}({\mathbf {f} }_{j},{\mathbf {f} }_{k})=0\,

and

\omega _{p}({\mathbf {e} }_{j},{\mathbf {f} }_{k})=\delta _{jk}\,

for $j,k=1,\dots ,n\,$ . For $p\in M\,$ , each fiber ${\mathbf {R} }_{p}\,$ of the principal ${\mathrm {Sp} }(n,{\mathbb {R} })$ -bundle $\pi _{\mathbf {R} }\colon {\mathbf {R} }\to M\,$ is the set of all symplectic bases of $T_{p}(M)\,$ .

The symplectic frame bundle $\pi _{\mathbf {R} }\colon {\mathbf {R} }\to M\,$ , a subbundle of the tangent frame bundle $\mathrm {F} M\,$ , is an example of reductive

G-structure

on the manifold

M\,

.

Notes

ISBN 978-3-540-33420-0

Books

Habermann, Katharina; Habermann, Lutz (2006), Introduction to Symplectic Dirac Operators,
ISBN 978-3-540-33420-0

da Silva, A.C., Lectures on Symplectic Geometry, Springer (2001).
doi:10.1007/978-3-540-45330-7

Maurice de Gosson: Symplectic Geometry and Quantum Mechanics (2006) Birkhäuser Verlag, Basel
ISBN 3-7643-7574-4
.

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[1] ISBN 978-3-540-33420-0

[1]

See also

Notes

Books