Доступ предоставлен для: Guest
Journal of Automation and Information Sciences

Выходит 12 номеров в год

ISSN Печать: 1064-2315

ISSN Онлайн: 2163-9337

SJR: 0.173 SNIP: 0.588 CiteScore™:: 2

Indexed in

Simulation of Quantum Control Systems. Part I. System Analysis of Physical Constraints

Том 30, Выпуск 2-3, 1998, pp. 33-38
DOI: 10.1615/JAutomatInfScien.v30.i2-3.50
Get accessGet access

Краткое описание

The paper develops an algebraic approach to the study of quantum control systems that is based on bilinear dynamical models defined on orbits of the adjoint representation of a compact Lie group. A mathematically correct model is constructed for the physical statement of the problem; the limits of its physical correctness are found.

ЛИТЕРАТУРА
  1. Butkovskii, A. G. and Samoilenko, Yu. I., Upravlenie kvantovo-mekhanicheskimi protsessami (Control of Quantum Mechanical Processes).

  2. Brockett, R. W., Lie Algebras and Lie Groups in Control Theory. In: Geometric Methods in Control Theory.

  3. Andreev, Yu. N., Differential-Geometrical Methods in Control Theory (a survey).

  4. Samoilenko, Yu. I., Smirnov, S. A., and Khorozov, O. A., Algebraic Methods for Optimization of Terminal Functionals of Quantum Mechanical Systems.

  5. Mackey G., Lektsiipo matematicheskim osnovam kvantovoi mekhaniki (Lectures on Mathematical Foundation of Quantum Mechanics).

  6. Akulin, V. M. and Karlov, N. V., Intensivnye resonansnye vzaimodeistviya v kvantovoi elektronike (Intensive Resonance Interaction in the Quantum Electronics).

  7. Klyshko, D. N., Fizicheskie osnovy kvantovoi elektroniki (Physical Foundations of Quantum Electronics).

Портал Begell Электронная Бибилиотека e-Книги Журналы Справочники и Сборники статей Коллекции Цены и условия подписки Begell House Контакты Language English 中文 Русский Português German French Spain