Examples of 'symplectic geometry' in a sentence
Meaning of "symplectic geometry"
symplectic geometry: This is a branch of mathematics that deals with geometric structures on symplectic manifolds, often used in the study of classical mechanics and Hamiltonian systems
How to use "symplectic geometry" in a sentence
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symplectic geometry
No previous knowledge in symplectic geometry is assumed.
In symplectic geometry one is instead interested in exterior powers of the cotangent bundle.
It is a result of fundamental importance in symplectic geometry.
The elementary notions of symplectic geometry and Hamiltonian dynamics are recalled in the first chapter.
Her fields of specialisation are algebraic and symplectic geometry.
His research field includes symplectic geometry and dynamical systems.
Another characterization of holonomic modules is via symplectic geometry.
Kronheimer on symplectic geometry.
Almost complex structures have important applications in symplectic geometry.
Category, Symplectic geometry.
Her research interests include algebraic geometry and symplectic geometry.
Introduction to symplectic geometry.
Generalised complex geometry is a geometrical framework that simultaneously generalises complex and symplectic geometry.
The study of symplectic manifolds is called symplectic geometry or symplectic topology.
With Katrin Wehrheim, she has challenged the foundational rigor of a classic proof in symplectic geometry.
See also
The Carathéodory-Jacobi-Lie theorem is a theorem in symplectic geometry which generalizes Darboux 's theorem.
Salamon 's field of research is symplectic topology and related fields such as symplectic geometry.
He is a specialist in symplectic geometry.
It is a foundational result in several fields, the chief among them being symplectic geometry.
An infinite dimensional analog of Morse homology in symplectic geometry is known as Floer homology.
Dusa McDuff was the first recipient of the award, for her work on symplectic geometry.
In mathematics, Floer homology is a tool for studying symplectic geometry and low-dimensional topology.
Her research topics included Teichmüller theory, hyperbolic geometry, ergodic theory, and symplectic geometry.
We study generalized complex geometry, which encompass complex and symplectic geometry as particular cases.
Among other things, Smith derived nodal invariants from symplectic geometry.
Currently at Michigan State University, he works in symplectic geometry and topology.
Thomas has made contributions to algebraic geometry, differential Geometry, and symplectic geometry.
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