Symplectic frame bundle: Difference between revisions

In symplectic geometry, the symplectic frame bundle^[1] of a given symplectic manifold ${\displaystyle (M,\omega )}$ is the canonical principal ${\displaystyle \mathrm{S}\mathrm{p}(n,ℝ)}$-subbundle ${\displaystyle {\pi }_{𝐑}:𝐑\to M}$ of the tangent frame bundle ${\displaystyle \mathrm{F}M}$ consisting of linear frames which are symplectic with respect to ${\displaystyle \omega }$. In other words, an element of the symplectic frame bundle is a linear frame ${\displaystyle u\in {\mathrm{F}}_p(M)}$ at point ${\displaystyle p\in M,}$ i.e. an ordered basis ${\displaystyle ({𝐞}_1,\dots ,{𝐞}_n,{𝐟}_1,\dots ,{𝐟}_n)}$ of tangent vectors at ${\displaystyle p}$ of the tangent vector space ${\displaystyle T_p(M)}$, satisfying

${\displaystyle {\omega }_p({𝐞}_j,{𝐞}_k)={\omega }_p({𝐟}_j,{𝐟}_k)=0}$ and ${\displaystyle {\omega }_p({𝐞}_j,{𝐟}_k)={\delta }_{jk}}$

for ${\displaystyle j,k=1,\dots ,n}$. For ${\displaystyle p\in M}$, each fiber ${\displaystyle {𝐑}_p}$ of the principal ${\displaystyle \mathrm{S}\mathrm{p}(n,ℝ)}$-bundle ${\displaystyle {\pi }_{𝐑}:𝐑\to M}$ is the set of all symplectic bases of ${\displaystyle T_p(M)}$.

The symplectic frame bundle ${\displaystyle {\pi }_{𝐑}:𝐑\to M}$, a subbundle of the tangent frame bundle ${\displaystyle \mathrm{F}M}$, is an example of reductive G-structure on the manifold ${\displaystyle M}$.

• Metaplectic group
• Metaplectic structure
• Symplectic basis
• Symplectic structure
• Symplectic geometry
• Symplectic group
• Symplectic spinor bundle

Template:Reflist

• Template:Citation
• da Silva, A.C., Lectures on Symplectic Geometry, Springer (2001). Template:Isbn. Template:Doi
• Maurice de Gosson: Symplectic Geometry and Quantum Mechanics (2006) Birkhäuser Verlag, Basel Template:Isbn.

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