Symplectic Coarse-Grained Classical and Semi-Classical Evolution of
Subsystems: New Theoretical Aspects
- URL: http://arxiv.org/abs/2002.06641v3
- Date: Thu, 16 Jul 2020 10:29:08 GMT
- Title: Symplectic Coarse-Grained Classical and Semi-Classical Evolution of
Subsystems: New Theoretical Aspects
- Authors: Maurice A. de Gosson
- Abstract summary: We study the classical and semiclassical time evolutions of subsystems of a Hamiltonian system.
Key tool in our study is an extension of Gromov's "principle of the symplectic" obtained in collaboration with N. Dias and J. Prata.
- Score: 0.0
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: We study the classical and semiclassical time evolutions of subsystems of a
Hamiltonian system; this is done using a generalization of Heller's thawed
Gaussian approximation introduced by Littlejohn. The key tool in our study is
an extension of Gromov's "principle of the symplectic camel" obtained in
collaboration with N. Dias and J. Prata. This extension says that the
orthogonal projection of a symplectic phase space ball on a phase space with a
smaller dimension also contains a symplectic ball with the same radius. In the
quantum case, the radii of these symplectic balls are taken equal to
sqrt(h_bar) and represent ellipsoids of minimum uncertainty, which we have
called "quantum blobs" in previous work.
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