nLab metaplectic structure

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Contents

Context

Symplectic geometry

symplectic geometry

higher symplectic geometry

Background

Basic concepts

Classical mechanics and quantization

Cohomology

cohomology

Special and general types

Special notions

Variants

Extra structure

Operations

Theorems

Contents

Idea

For (X,ω)(X, \omega) a symplectic manifold a metaplectic structure on XX is a G-structure for GG the metaplectic group, hence a lift of structure groups of the tangent bundle from the symplectic group to the metaplectic group through the double cover map Mp(2n,)Sp(2n,)Mp(2n, \mathbb{R}) \to Sp(2n, \mathbb{R}):

BMp(2n,) metaplecticstructure X TX BSp(2n,). \array{ && \mathbf{B}Mp(2n, \mathbb{R}) \\ & {}^{\mathllap{metaplectic \atop structure}}\nearrow & \downarrow \\ X &\stackrel{T X}{\to}& \mathbf{B} Sp(2n, \mathbb{R}) } \,.

Analogously for the Mp^c-group one considers Mp cMp^c-structures.

Properties

Relation to metalinear structure

Theorem

Let (X,ω)(X,\omega) be a symplectic manifold and LTXL \subset T X a subbundle of Lagrangian subspaces of the tangent bundle. Then TXT X admits a metaplectic structure precisely if LL admits a metalinear structure.

(Bates-Weinstein, theorem 7.16)

Existence of Mp cMp^c-structures

Theorem

Every Sp-principal bundle has a lift to an Mp^c-principal bundle.

(Robinson-Rawnsley 89, theorem (6.2))

For more details, see at metaplectic group – (Non-)Triviality of Extensions.

References

Last revised on January 21, 2015 at 23:35:06. See the history of this page for a list of all contributions to it.

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