Reducing QUBO Density by Factoring Out Semi-Symmetries

TL;DR

This paper introduces semi-symmetries in QUBO matrices and presents an algorithm to reduce problem complexity, leading to significant improvements in quantum algorithm efficiency and scalability for combinatorial optimization problems.

Contribution

The paper proposes a novel method to identify and factor semi-symmetries in QUBO matrices, reducing circuit depth and embedding complexity in quantum algorithms.

Findings

Up to 45% reduction in couplings and circuit depth for QAOA.

Reduced problem embedding complexity in Quantum Annealing.

Improved performance and scalability of quantum algorithms on structured problems.

Abstract

Quantum Approximate Optimization Algorithm (QAOA) and Quantum Annealing are prominent approaches for solving combinatorial optimization problems, such as those formulated as Quadratic Unconstrained Binary Optimization (QUBO). These algorithms aim to minimize the objective function $x^T Q x$, where $Q$ is a QUBO matrix. However, the number of two-qubit CNOT gates in QAOA circuits and the complexity of problem embeddings in Quantum Annealing scale linearly with the number of non-zero couplings in $Q$, contributing to significant computational and error-related challenges. To address this, we introduce the concept of \textit{semi-symmetries} in QUBO matrices and propose an algorithm for identifying and factoring these symmetries into ancilla qubits. \textit{Semi-symmetries} frequently arise in optimization problems such as \textit{Maximum Clique}, \textit{Hamilton Cycles}, \textit{Graph Coloring}, and \textit{Graph Isomorphism}. We theoretically demonstrate that the modified QUBO matrix $Q_{\text{mod}}$ retains the same energy spectrum as the original $Q$. Experimental evaluations on the aforementioned problems show that our algorithm reduces the number of couplings and QAOA circuit depth by up to $45\%$. For Quantum Annealing, these reductions also lead to sparser problem embeddings, shorter qubit chains and better performance. This work highlights the utility of exploiting QUBO matrix structure to optimize quantum algorithms, advancing their scalability and practical applicability to real-world combinatorial problems.