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Biunitary transformations and ordinary differential equations.—III

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Il Nuovo Cimento B (1971-1996)

Summary

In two previous papers, the authors have introduced the concept of binormal differential equations. It has been shown that invariants of the Courant-Snyder type are associated to the scalar products of the column vector associated to an ordinary differential equation and to its binormal. In this paper, we show the equivalence of the above invariant and the Lewis form. We also introduce a density matrix for a second-order differential equation and clarify the geometrical meaning of the Twiss parameters. The importance of the above results in the analysis of quantum problems such as,e.g., the evolution of squeezed states is finally stressed.

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Authors and Affiliations

  1. Dip. Sviluppo Tecnologie di Punta, CRE Frascati, ENEA, C.P. 65, 00044 Frascati, Roma, Italia

    G. Dattoli, V. Loreto (ENEA student), C. Mari, M. Richetta (ENEA guest) & A. Torre

Authors
  1. G. Dattoli
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  2. V. Loreto
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  3. C. Mari
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  4. M. Richetta
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  5. A. Torre
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Dattoli, G., Loreto, V., Mari, C. et al. Biunitary transformations and ordinary differential equations.—III. Nuovo Cim B 106, 1391–1399 (1991). https://doi.org/10.1007/BF02728368

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  • DOI: https://doi.org/10.1007/BF02728368

PACS 02.30.Hq

PACS 02.20.Tw

PACS 42.10

PACS 41.80

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