Utilizing Novel Quantum Counters for Grover's Algorithm to Solve the Dominating Set Problem

TL;DR

This paper introduces the use of novel quantum counters with reduced qubit requirements, shorter depth, and fewer gates to enhance Grover's algorithm for solving the NP-complete dominating set problem on NISQ-era quantum computers.

Contribution

It proposes a new quantum oracle construction utilizing quantum counters optimized for NISQ devices to efficiently solve the dominating set problem with Grover's algorithm.

Findings

Successfully implemented the quantum circuit on IBM Quantum Lab.

Demonstrated the circuit's ability to solve the dominating set problem.

Showed improvements in qubit count and circuit depth compared to traditional methods.

Abstract

Grover's algorithm is a well-known unstructured quantum search algorithm run on quantum computers. It constructs an oracle and calls the oracle O($\sqrt N$) times to locate specific data out of N unsorted data. This represents a quadratic speedup compared to the classical unstructured data sequential search algorithm, which requires to call the oracle O(N) times. We are currently in the noisy intermediate-scale quantum (NISQ) era in which quantum computers have a limited number of qubits, short decoherence time, and low gate fidelity. It is thus desirable to design quantum components with three good properties: (i) a reduced number of qubits, (ii) shorter quantum depth, and (iii) fewer gates. This paper utilizes novel quantum counters with the above-mentioned three good properties to construct the oracle of Grover's algorithm to efficiently solve the dominating set problem (DSP), as defined below. For a given graph G=(V, E), a dominating set (DS) D is a subset of the vertex set V, such that every vertex is in D or has an adjacent vertex in D. The DSP is to decide for a given graph G and an integer k whether there exists a DS with size k. Algorithms solving the DSP have many applications. For example, they can be applied to check whether k routers suffice to connect all computers in a computer network. The DSP is an NP-complete problem, indicating that no classical algorithm exists to solve the DSP with polynomial time complexity in the worst case. Therefore, using quantum algorithms, such as Grover's algorithm, to exploit the potent computational capabilities of quantum computers to solve the DSP is highly promising. We execute the whole quantum circuit of Grover's algorithm using novel quantum counters through the IBM Quantum Lab service to validate that the circuit can solve the DSP efficiently and correctly.