Scaling quantum processors presents a significant hurdle in the development of quantum computing, and distributing circuits across multiple cores currently appears to be one of the most promising solutions. Researchers, including J. Montes from the Universidad Politécnica de Madrid, F. Borondo from the Universidad Autónoma de Madrid, and Gabriel G. Carlo from CONICET, now demonstrate the existence of a universal, optimal configuration for arranging quantum gates across these interconnected cores. This work identifies a layout that maximises the complexity of a quantum circuit while minimising its operational depth, a crucial step towards building more powerful and efficient quantum computers. The team’s findings, based on a novel complexity measure linked to convergence rates, offer a fundamental design principle for future distributed quantum processors and validate existing benchmarks in the field.
Optimal Core Balance Maximizes Quantum Complexity
Researchers have discovered a universal principle governing the optimal arrangement of quantum processors, paving the way for more powerful and scalable quantum computers. The team demonstrated that in distributed quantum circuits, where processing is divided among multiple cores, there exists an ideal balance between operations performed within each core and those connecting them. This balance maximizes the complexity of the computation achieved before applying inter-core connections, significantly enhancing processing efficiency. The research centers on understanding how entanglement, a key quantum phenomenon, spreads across these interconnected cores.
By analyzing the evolution of the quantum state, the team found that simply increasing the number of operations within each core does not always lead to the most effective computation. Instead, there is a specific number of intra-core operations that, when combined with inter-core connections, generates the greatest computational complexity. This optimal point consistently emerges regardless of the specific network topology, whether the cores are arranged in a linear chain, a ring, a star, or a fully connected network. Importantly, the team’s findings reveal that the optimal number of intra-core operations is not determined by exponential decay, a common characteristic of many quantum processes.
Instead, the decay is slower, allowing for a finite point where the computational complexity is maximized. This slower decay is directly linked to the presence of two-qubit gates connecting different cores, which redistribute entanglement and reshape the way the quantum state evolves. The researchers validated their analytical predictions through extensive numerical simulations across various network configurations, consistently observing a well-defined peak in computational complexity. For example, in configurations with four cores, the optimal number of intra-core iterations was found to be around three to five, depending on the network topology.
This discovery provides a fundamental design principle for building more efficient and scalable quantum computers, offering a pathway to harness the full potential of quantum computation. The team used a mathematical tool, based on “Markov matrices”, to model the evolution of the quantum state, allowing them to pinpoint this optimal balance and providing a quantitative criterion for assessing the capability of multicore architectures to efficiently approximate random quantum circuits. Future work should explore the impact of imperfections and errors, as well as extend this approach to different types of quantum gates.
👉 More information
🗞 Universal Configuration for Optimizing Complexity in Variational Distributed Quantum Circuits
🧠 ArXiv: https://arxiv.org/abs/2508.04464