Symplectic reduction on pseudomanifolds
The dissertation consists of symplectic reduction on a Fr¨olicher space which is locally diffeomorphic to an Euclidean Fr¨olicher subspaces of Rn of constant dimension equal to n. Such a space is called a Fr¨olicher pseudomanifold or simply a pseudomanifold. The symplectic reduction under conside...
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| Format: | Others |
| Language: | en |
| Published: |
2009
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| Online Access: | http://hdl.handle.net/10539/7354 |
| Summary: | The dissertation consists of symplectic reduction on a Fr¨olicher space which is
locally diffeomorphic to an Euclidean Fr¨olicher subspaces of Rn of constant dimension
equal to n. Such a space is called a Fr¨olicher pseudomanifold or simply a
pseudomanifold. The symplectic reduction under consideration in this work is an
extension of the Marsden-Weinstein quotient (the reduced space) well-known for
the finite-dimensional smooth manifold. Starting with a proper and free action of
a Fr¨olicher-Lie-group on a finite constant dimensional pseudomanifold, we study
the smooth structure induced on a small subspace of the orbit space.
Aside the algebraic and geometric study of these new objects(pseudomanifolds),
the work contains their topological fundamentals and symplectic structures, as
well as an introduction to the geometric control theory. |
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