Using the tomographic probability distribution (symplectic tomogram) describing the quantum state (instead of the wave function or density matrix) and properties of recently introduced tomographic entropy associated with the probability distribution, the new uncertainty relation for the tomographic entropy is obtained. Examples of the entropic uncertainty relation for squeezed states and solitons of the Bose-Einstein condensate are considered.
New uncertainty relations for tomographic entropy: application to squeezed states and solitons / S., De Nicola; Fedele, Renato; M. A., Man'Ko; V. I., Man'Ko. - In: THE EUROPEAN PHYSICAL JOURNAL. B, CONDENSED MATTER PHYSICS. - ISSN 1434-6028. - STAMPA. - 52:(2006), pp. 191-198. [10.1140/epjb/e2006-00280-0]
New uncertainty relations for tomographic entropy: application to squeezed states and solitons
FEDELE, RENATO;
2006
Abstract
Using the tomographic probability distribution (symplectic tomogram) describing the quantum state (instead of the wave function or density matrix) and properties of recently introduced tomographic entropy associated with the probability distribution, the new uncertainty relation for the tomographic entropy is obtained. Examples of the entropic uncertainty relation for squeezed states and solitons of the Bose-Einstein condensate are considered.File | Dimensione | Formato | |
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