In quantum computing, a quantum register is a system comprising multiple qubits.[1] It is the quantum analogue of the classical processor register. Quantum computers perform calculations by manipulating qubits within a quantum register.[2]

Definition

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It is usually assumed that the register consists of qubits. It is also generally assumed that registers are not density matrices, but that they are pure, although the definition of "register" can be extended to density matrices.

An   size quantum register is a quantum system comprising   pure qubits.

The Hilbert space,  , in which the data is stored in a quantum register is given by   where   is the tensor product.[3]

The number of dimensions of the Hilbert spaces depends on what kind of quantum systems the register is composed of. Qubits are 2-dimensional complex spaces ( ), while qutrits are 3-dimensional complex spaces ( ), etc. For a register composed of N number of d-dimensional (or d-level) quantum systems we have the Hilbert space  

The registers quantum state can in the bra-ket notation be written   The values   are probability amplitudes. Because of the Born rule and the 2nd axiom of probability theory,   so the possible state space of the register is the surface of the unit sphere in  

Examples:

  • The quantum state vector of a 5-qubit register is a unit vector in  
  • A register of four qutrits similarly is a unit vector in  

Quantum vs. classical register

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First, there's a conceptual difference between the quantum and classical register. An   size classical register refers to an array of   flip flops. An   size quantum register is merely a collection of   qubits.

Moreover, while an   size classical register is able to store a single value of the   possibilities spanned by   classical pure bits, a quantum register is able to store all   possibilities spanned by quantum pure qubits at the same time.

For example, consider a 2-bit-wide register. A classical register is able to store only one of the possible values represented by 2 bits -   accordingly.

If we consider 2 pure qubits in superpositions   and  , using the quantum register definition   it follows that it is capable of storing all the possible values (by having non-zero probability amplitude for all outcomes) spanned by two qubits simultaneously.

See also

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References

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  1. ^ Ekert, Artur; Hayden, Patrick; Inamori, Hitoshi (2008). "Basic Concepts in Quantum Computation". Coherent atomic matter waves. Les Houches - Ecole d'Ete de Physique Theorique. Vol. 72. pp. 661–701. arXiv:quant-ph/0011013. doi:10.1007/3-540-45338-5_10. ISBN 978-3-540-41047-8. S2CID 53402188.
  2. ^ Ömer, Bernhard (2000-01-20). Quantum Programming in QCL (PDF) (Thesis). p. 52. Retrieved 2021-05-24.
  3. ^ Major, Günther W., V.N. Gheorghe, F.G. (2009). Charged particle traps II : applications. Berlin: Springer. p. 220. ISBN 978-3540922605.{{cite book}}: CS1 maint: multiple names: authors list (link)

Further reading

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