Qutrit

A qutrit (or quantum trit) is a unit of quantum information that is realized by a quantum system described by a superposition of three mutually orthogonal quantum states.^[1]

The qutrit is analogous to the classical base-3 trit, just as the qubit, a quantum system described by a superposition of two orthogonal states, is analogous to the classical base-2 bit.

Representation

A qutrit has three orthonormal basis states or vectors, often denoted $|0\rangle$ , $|1\rangle$ , and $|2\rangle$ in Dirac or bra–ket notation. These are used to describe the qutrit as a superposition state vector in the form of a linear combination of the three orthonormal basis states:

|\psi\rangle = \alpha |0\rangle + \beta |1\rangle + \gamma |2\rangle

,

where the coefficients are complex probability amplitudes, such that the sum of their squares is unity (normalization):

| \alpha |^2 + | \beta |^2 + | \gamma |^2 = 1 \,

The qubit's orthonormal basis states $\{|0\rangle ,|1\rangle \}$ span the two-dimensional complex Hilbert space $H_{2}$ , corresponding to spin-up and spin-down of a spin-1/2 particle. Qutrits require a Hilbert space of higher dimension, namely the three-dimensional $H_{3}$ spanned by the qutrit's basis $\{|0\rangle ,|1\rangle ,|2\rangle \}$ ,^[2] which can be realized by a three-level quantum system. Note, however, that not all three-level quantum systems are qutrits.^[3]

A string of n qutrits represents 3ⁿ different states simultaneously, i.e., a superposition state vector in 3ⁿ-dimensional complex Hilbert space.^[4]

Qutrits have several peculiar features when used for storing quantum information. For example, they are more robust to decoherence under certain environmental interactions.^[5] In reality, manipulating qutrits directly might be tricky, and one way to do that is by using an entanglement with a qubit.^[6]

References

↑ Nisbet-Jones, Peter B. R.; Dilley, Jerome; Holleczek, Annemarie; Barter, Oliver; Kuhn, Axel (2013). "Photonic qubits, qutrits and ququads accurately prepared and delivered on demand". New Journal of Physics. 15 (5): 053007. doi:10.1088/1367-2630/15/5/053007. ISSN 1367-2630.
↑ Byrd, Mark (1998). "Differential geometry on SU(3) with applications to three state systems". Journal of Mathematical Physics. 39 (11): 6125–6136. arXiv:math-ph/9807032. doi:10.1063/1.532618. ISSN 0022-2488.
↑ "Quantum systems: three-level vs qutrit". Physics Stack Exchange. Retrieved 2018-07-25.
↑ Caves, Carlton M.; Milburn, Gerard J. (2000). "Qutrit entanglement". Optics Communications. 179 (1–6): 439–446. doi:10.1016/s0030-4018(99)00693-8. ISSN 0030-4018.
↑ A. Melikidze, V. V. Dobrovitski, H. A. De Raedt, M. I. Katsnelson, and B. N. Harmon, Parity effects in spin decoherence, Phys. Rev. B 70, 014435 (2004) (link)
↑ B. P. Lanyon,1 T. J. Weinhold, N. K. Langford, J. L. O'Brien, K. J. Resch, A. Gilchrist, and A. G. White, Manipulating Biphotonic Qutrits, Phys. Rev. Lett. 100, 060504 (2008) (link)

External links

Physicists Demonstrate Qubit-Qutrit Entanglement by Lisa Zyga at Physorg.com, February 26, 2008 . Accessed March 2008
qudit—Wiktionary.

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[1] Nisbet-Jones, Peter B. R.; Dilley, Jerome; Holleczek, Annemarie; Barter, Oliver; Kuhn, Axel (2013). "Photonic qubits, qutrits and ququads accurately prepared and delivered on demand". New Journal of Physics. 15 (5): 053007. doi:10.1088/1367-2630/15/5/053007. ISSN 1367-2630.

[2] Byrd, Mark (1998). "Differential geometry on SU(3) with applications to three state systems". Journal of Mathematical Physics. 39 (11): 6125–6136. arXiv:math-ph/9807032. doi:10.1063/1.532618. ISSN 0022-2488.

[3] "Quantum systems: three-level vs qutrit". Physics Stack Exchange. Retrieved 2018-07-25.

[4] Caves, Carlton M.; Milburn, Gerard J. (2000). "Qutrit entanglement". Optics Communications. 179 (1–6): 439–446. doi:10.1016/s0030-4018(99)00693-8. ISSN 0030-4018.

[5] A. Melikidze, V. V. Dobrovitski, H. A. De Raedt, M. I. Katsnelson, and B. N. Harmon, Parity effects in spin decoherence, Phys. Rev. B 70, 014435 (2004) (link)

[6] B. P. Lanyon,1 T. J. Weinhold, N. K. Langford, J. L. O'Brien, K. J. Resch, A. Gilchrist, and A. G. White, Manipulating Biphotonic Qutrits, Phys. Rev. Lett. 100, 060504 (2008) (link)

Qutrit

Representation

See also

References

External links