A coisotropic embedding theorem for pre-multisymplectic manifolds
Luca Schiavone
TL;DR
This paper extends the classical coisotropic embedding theorem to the setting of pre-multisymplectic manifolds, providing a new geometric result in higher-dimensional symplectic geometry.
Contribution
It introduces a coisotropic embedding theorem analogous to Gotay's for pre-multisymplectic manifolds, expanding the theoretical framework of multisymplectic geometry.
Findings
Established a coisotropic embedding theorem for pre-multisymplectic manifolds
Generalized classical symplectic results to higher-dimensional contexts
Provided foundational results for future research in multisymplectic geometry
Abstract
We prove a coisotropic embedding theorem \`a l\`a Gotay for pre-multisymplectic manifolds.
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Taxonomy
TopicsGeometric and Algebraic Topology · Mathematical Dynamics and Fractals · Geometric Analysis and Curvature Flows