Rydberg Atoms/Quantum simulation

Quantum logic gates are represented by unitary matrices that transform the quantum state before the operation into another after the application of the quantum gate. As such, they can be seen as the time-evolution operator acting for discrete timesteps,

${\displaystyle |\psi (\tau _{n+1})\rangle =U(\tau _{n},\tau _{n+1})|\psi (\tau _{n})\rangle .}$ 

The basis set for the quantum state ${\displaystyle |\psi \rangle }$  is given by a product basis of two-level systems (quantum bits or "qubits"),

${\displaystyle |\psi \rangle =\sum _{i\in \{0,1\},j\in \{0,1\},\ldots }c_{ij\ldots }|ij\ldots \rangle .}$ 

We can also think of the operation ${\displaystyle U}$  to be constructed out of several smaller building blocks,

${\displaystyle U(\tau _{n},\tau _{n+1})=\prod _{i}^{N}U(\tau _{n+(i-1)/N},\tau _{n+i/N}).}$ 

For simplicity, we want to restrict ourselves to a universal set of quantum gates that can be used to construct any other gate from it. This can be realized by a set of three quantum gates, including the ${\displaystyle z}$  rotation gate,

${\displaystyle R_{z}(\phi )=\exp(i\phi \sigma _{z})=\left({\begin{array}{cc}e^{i\phi }&\\&e^{-i\phi }\end{array}}\right),}$ 

where ${\displaystyle \phi }$  is an arbitrary rotation angle. To construct any other single qubit quantum gate, we need a second gate that does not commute with ${\displaystyle R_{z}}$ . The most convenient choice is the Hadamard gate given by

${\displaystyle U_{H}={\frac {1}{\sqrt {2}}}\left({\begin{array}{cc}1&1\\1&-1\end{array}}\right).}$ 

The Hadamard gate can be used to transform ${\displaystyle \sigma _{z}}$  into ${\displaystyle \sigma _{x}}$  and vice versa, i.e.,

${\displaystyle R_{x}(\phi )=\exp(i\phi \sigma _{x})=\left({\begin{array}{cc}\cos \phi &i\sin \phi \\i\sin \phi &\cos \phi \end{array}}\right)=U_{H}R_{z}(\phi )U_{H}}$ 

${\displaystyle R_{z}(\phi )=U_{H}R_{x}(\phi )U_{H}.}$ 

Note that while the Hadamard gate is Hermitian, ${\displaystyle U_{H}^{\dagger }=U_{H}}$ , most quantum gates are not. Finally, rotations about the ${\displaystyle y}$  axis can be constructed as

${\displaystyle R_{y}(\phi )=\exp(i\phi \sigma _{y})=R_{z}(-\pi /4)R_{x}(\phi )R_{z}(\pi /4).}$ 

Single qubit rotation do not allow us to generate entanglement between the qubits. Therefore, it is necessary to include a two-qubit quantum gate, which is most coveniently chosen as the controlled-not (CNOT) gate, acting on two qubits ${\displaystyle A}$  and ${\displaystyle B}$  as

${\displaystyle U_{CNOT}=|0\rangle \langle 0|_{A}\otimes 1_{B}+|1\rangle \langle 1|_{A}\otimes \sigma _{B}^{x}=\left({\begin{array}{cccc}1\\&1\\&&&1\\&&1\end{array}}\right).}$ 

Its function can be understood as follows: If the "control" qubit ${\displaystyle A}$  is in the 0 state, nothing happens. However, if ${\displaystyle A}$  is in 1, the target qubit ${\displaystyle B}$  gets flipped by the ${\displaystyle \sigma _{x}}$  operation. As an example, let us study the creation of entanglement between two qubits by a gate sequence consisting of a single Hadamard gate, followed by a CNOT operation. The qubits are initialized in the product state ${\displaystyle |00\rangle }$ . Then, we have

${\displaystyle |\psi \rangle =U_{CNOT}U_{H}^{A}|00\rangle ={\frac {1}{\sqrt {2}}}(|00\rangle +|11\rangle ),}$ 

which is a maximally entangled state as its reduced density matrix is the maximally mixed state. The set of ${\displaystyle R_{z}(\phi )}$ , ${\displaystyle U_{H}}$ , and ${\displaystyle U_{CNOT}}$  forms a universal set for all ${\displaystyle N}$ -qubit quantum gates ^[6].

It is often convenient to use a pictorial representation for quantum gate networks, also known as quantum circuits. Each qubit is represented by a straight line, with the horizontal axis denoting time, and each single qubit gate is shown a rectangular box acting on the particular qubit. Two-qubit gates are represented in a similar way, with the control qubit being indicated by a small circle, see Fig. 1. In this notation, much more complex quantum circuits can be represented and analyzed, for instance the decomposition of the Toffoli gate,

${\displaystyle U_{T}=\left({\begin{array}{cccccccc}1\\&1\\&&1\\&&&1\\&&&&&1\\&&&&&&&1\\&&&&&&1\end{array}}\right),}$ 

which is a 3-qubit variant of the CNOT gate and is universal for all classical computations. It can be constructed from elementary gates, see Fig. 2, where ${\displaystyle T=R_{z}(\pi /8)}$  ^[5].

Suppose we want to simulate a four-body spin interaction of the form

${\displaystyle H=E_{0}\sigma _{x}^{(1)}\sigma _{x}^{(2)}\sigma _{x}^{(3)}\sigma _{x}^{(4)}.}$ 

This four-body spin operator has two eigenvalues, ${\displaystyle \pm 1}$ , which are eightfold degenerate. The key idea is to use an additional auxiliary particle and encode the eigenvalue into its spin state. If the auxiliary control spin is initially in ${\displaystyle |0\rangle }$ , this can be done using the gate sequence

${\displaystyle G=U_{H}^{(c)}\left(\prod _{i=1}^{4}U_{CNOT}^{(c,i)}\right)U_{H}^{(c)}.}$ 

To understand this in more detail, let us look at the behavior of the gate sequence on the spin state ${\displaystyle |\pm 1,\lambda \rangle }$ , where ${\displaystyle \lambda }$  labels the state within the degenerate manifold. The first Hadamard gate will yield

${\displaystyle U_{H}^{(c)}|0\rangle _{c}|\pm 1,\lambda \rangle ={\frac {1}{\sqrt {2}}}(|0\rangle _{c}+|1\rangle _{c})|\pm 1,\lambda \rangle .}$ 

Applying the sequence of CNOT gates will multiply the eigenvalue of the spin interaction, conditional on the control spin being in ${\displaystyle |1\rangle }$ ,

${\displaystyle \prod _{i}U_{CNOT}^{c,i}{\frac {1}{\sqrt {2}}}(|0\rangle _{c}+|1\rangle _{c})|\pm 1,\lambda \rangle ={\frac {1}{\sqrt {2}}}(|0\rangle _{c}\pm |1\rangle _{c})|\pm 1,\lambda \rangle .}$ 

Finally, the second Hadamard gate will give us

${\displaystyle U_{H}^{(c)}{\frac {1}{\sqrt {2}}}(|0\rangle _{c}+|1\rangle _{c})|+1,\lambda \rangle =|0\rangle _{c}|+1,\lambda \rangle }$ 

${\displaystyle U_{H}^{(c)}{\frac {1}{\sqrt {2}}}(|0\rangle _{c}-|1\rangle _{c})|-1,\lambda \rangle =|1\rangle _{c}|-1,\lambda \rangle }$ .

Consequently, we have mapped the eigenvalue of the four-body interaction operator onto the state of a single auxiliary spin.

The full quantum simulation of the dynamics ${\displaystyle U=\exp(-iHt)}$  can then be realized by applying a ${\displaystyle z}$  rotation to the control spin and reverse the mapping ${\displaystyle G}$ ,

${\displaystyle U=\exp(-iE_{0}\sigma _{x}^{(1)}\sigma _{x}^{(2)}\sigma _{x}^{(3)}\sigma _{x}^{(4)}t)=GR_{z}(-\phi )G.}$ 

The phase of the ${\displaystyle z}$  rotation is related to the timescale of the simulation according to ${\displaystyle \phi =E_{0}t}$ .

For a many-body system, the full dynamics can be simulated if the gate sequences are applied in parallel (if they act on independent spins) or sequentially (if they act on the same spins). However, in case of non-commuting operators, one has to ensure that this sequential operations does not introduce errors. This is true if the timestep ${\displaystyle \tau }$  of the simulation procedure is sufficiently small, as can be seen from the Suzuki-Trotter expansion

${\displaystyle \exp[-i(H_{A}+H_{B})\tau ]=\exp(-iH_{A}\tau )\exp(-iH_{B}\tau )+O(\tau ^{2}).}$ 

This completes the toolbox required for the realization of a universal quantum simulator.

1. ↑ Cite error: Invalid <ref> tag; no text was provided for refs named Bernstein1997
2. ↑ Cite error: Invalid <ref> tag; no text was provided for refs named Schollwock2011
3. ↑ Cite error: Invalid <ref> tag; no text was provided for refs named Feynman1982
4. ↑ Lloyd, Seth (1996-08-23). "Universal Quantum Simulators". Science 273 (5278): 1073-1078. doi:10.1126/science.273.5278.1073. ISSN 1095-9203 0036-8075, 1095-9203. http://www.sciencemag.org/content/273/5278/1073. Retrieved 2013-06-26. 
5. ↑ ^{5.0 5.1} Nielsen, Michael A; Chuang, Isaac L (2010). Quantum computation and quantum information. Cambridge, UK: Cambridge University Press. ISBN 9781107002173. 
6. ↑ Barenco, Adriano; Charles H. Bennett, Richard Cleve, David P. DiVincenzo, Norman Margolus, Peter Shor, Tycho Sleator, John A. Smolin, Harald Weinfurter (1995-11-01). "Elementary gates for quantum computation". Physical Review A 52 (5): 3457-3467. doi:10.1103/PhysRevA.52.3457. http://link.aps.org/doi/10.1103/PhysRevA.52.3457. Retrieved 2013-06-27.