A Scalable Distributed Quantum Optimization Framework via Factor Graph Paradigm

TL;DR

This paper presents a structure-aware distributed quantum optimization framework that leverages factor graphs and shared entanglement to achieve Grover-like speedup while reducing qubit requirements, enabling scalable quantum computing.

Contribution

It introduces a novel factor graph-based approach for distributed quantum optimization that preserves Grover's quadratic speedup and scales to large problems with hierarchical strategies.

Findings

Achieves $O(\sqrt{N})$ query complexity with relaxed qubit requirements.

Supports fault-tolerant and near-term hybrid operation modes.

Validated through simulations on diverse network topologies.

Abstract

Distributed quantum computing (DQC) connects many small quantum processors into a single logical machine, offering a practical route to scalable quantum computation. However, most existing DQC paradigms are structure-agnostic. Circuit cutting proposed by Peng et al. in [Phys. Rev. Lett., Oct. 2020] reduces per-device qubits at the cost of exponential classical post-processing, while search-space partitioning proposed by Avron et al. in [Phys. Rev. A., Nov. 2021] distributes the workload but weakens Grover's ideal quadratic speedup. In this paper, we introduce a structure-aware framework for distributed quantum optimization that resolves this complexity-resource trade-off. We model the objective function as a factor graph and expose its sparse interaction structure. We cut the graph along its natural ``seams'', i.e., a separator of boundary variables, to obtain loosely coupled subproblems that fit on resource-constrained processors. We coordinate these subproblems with shared entanglement, so the network executes a single globally coherent search rather than independent local searches. We prove that this design preserves Grover-like scaling: for a search space of size $N$, our framework achieves $O(\sqrt{N})$ query complexity up to processors and separator dependent factors, while relaxing the qubit requirement of each processor. We extend the framework with a hierarchical divide-and-conquer strategy that scales to large-scale optimization problems and supports two operating modes: a fully coherent mode for fault-tolerant networks and a hybrid mode that inserts measurements to cap circuit depth on near-term devices. We validate the predicted query-entanglement trade-offs through simulations over diverse network topologies, and we show that structure-aware decomposition delivers a practical path to scalable distributed quantum optimization on quantum networks.