Adam, P.; Andreev, V.A.; Man’ko, M.A.; Man’ko, V.I.; Mechler, M.
SU(2) Symmetry of Qubit States and Heisenberg–Weyl Symmetry of Systems with Continuous Variables in the Probability Representation of Quantum Mechanics. Symmetry 2020, 12, 1099.
https://doi.org/10.3390/sym12071099
AMA Style
Adam P, Andreev VA, Man’ko MA, Man’ko VI, Mechler M.
SU(2) Symmetry of Qubit States and Heisenberg–Weyl Symmetry of Systems with Continuous Variables in the Probability Representation of Quantum Mechanics. Symmetry. 2020; 12(7):1099.
https://doi.org/10.3390/sym12071099
Chicago/Turabian Style
Adam, Peter, Vladimir A. Andreev, Margarita A. Man’ko, Vladimir I. Man’ko, and Matyas Mechler.
2020. "SU(2) Symmetry of Qubit States and Heisenberg–Weyl Symmetry of Systems with Continuous Variables in the Probability Representation of Quantum Mechanics" Symmetry 12, no. 7: 1099.
https://doi.org/10.3390/sym12071099
APA Style
Adam, P., Andreev, V. A., Man’ko, M. A., Man’ko, V. I., & Mechler, M.
(2020). SU(2) Symmetry of Qubit States and Heisenberg–Weyl Symmetry of Systems with Continuous Variables in the Probability Representation of Quantum Mechanics. Symmetry, 12(7), 1099.
https://doi.org/10.3390/sym12071099