[Summary] Grover's algorithm circuit and its implementation have already been described in this article. One of the challenges was generating an oracle according to the search target. When the number of qubits was 2 or 3, it was possible to create it through trial and error, but as the number of qubits increases, it becomes difficult. Therefore, Qiskit provides the Quantum Algorithms Module[1]. This includes Grover. It consists of PhaseOracle, which generates oracles for phase inversion, and Amplification, which amplifies the probability amplitude. By using this, it becomes easy to create large-scale Grover circuits. Additionally, since PhaseOracle can generate oracles from logical expressions, it can be easily applied to 3-SAT problems, etc.[2] The implementation status will also be described.
There are various 3-SAT solvers that use classical computers. Although the content of this article cannot reach the performance of those systems, I would like to connect it to thinking about the potential possibilities for extremely large-scale problems. This is true for quantum computing in general.
●Generate oracle from logical formula and amplify probability amplitude
As a simple 2-qubits example, let |10> be the state to be searched. Give a logical expression '(a&~b)' to PhaseOracle to generate an Oracle for it. Next, give the generated Oracle to AmplificationProblem, which has a probability amplitude amplification function. The generated Oracle circuit diagram is shown below. The two filled-in circles and their connections in the circuit diagram are the same as CZ (Controlled Pauli-Z).
Furthermore, draw the entire Grover circuit diagram as shown below. Here, the open circle means that the gate of the target bit is activated when the control bit is |0>.
The results of running this circuit with a simulator (ibmq_qasm) are shown below. As expected, '10' was observed with probability 1.0. In the display below, '01' is measured. This is because the order of the bits in the execution result on the actual machine is the reverse order compared to when they were given as input.
●Solving 3-SAT problems using Grover's algorithm
Next, as an example, solve the 3-SAT shown below. If you give the logical formula of the problem to PhaseOracle as shown below, the corresponding Oracle will be generated. Furthermore, similar to the example above, you can create a circuit of the Grover algorithm that includes this Oracle. Below is the Oracle schematic and the entire algorithm schematic.
Next, as a backend, set up a quantum simulator or a real quantum computer, generate a Grover object, give the above Grover circuit to its method amplify, and run it. The number of repetitions was 1. In other words, iterations=1. The method for calculating the optimal value for Iterations has been clarified, and in this case (3 qubits and 3 solutions), 1 is optimal.
Finally, we show calculation results using a simulator (ibmq_qsam) and an actual quantum computer (brisbane with 127 qubits). Since a certain amount of errors occur on a real machine, the separation of solutions is a little less clear than in the case of a simulator, but it can be said that three correct solutions have been found. (Note) The bit order of the execution result is in the reverse order of the tensor product.
References
[1] James L. Weaver & Frank J. Harkins, “Qiskit Pocket Guide”, O’reilly, 2022.
[2] Grover's algorithm examples,
https://github.com/Qiskit/qiskit-tutorials/blob/master/tutorials/algorithms/07_grover_examples.ipynb
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