Related papers: Quantum Reverse Mapping: Synthesizing an Optimal Spin Qubit Shuttling Bus Architecture for the Surface Code

Quantum Reverse Mapping: Synthesizing an Optimal Spin Qubit Shuttling Bus Architecture for the Surface Code

URL: http://arxiv.org/abs/2510.17689v1
Date: Mon, 20 Oct 2025 16:05:36 GMT
Title: Quantum Reverse Mapping: Synthesizing an Optimal Spin Qubit Shuttling Bus Architecture for the Surface Code
Authors: Pau Escofet, Eduard Alarcón, Sergi Abadal, Andrii Semenov, Niall Murphy, Elena Blokhina, Carmen G. Almudéver,
Abstract summary: A high-quality encoding allows future compilation techniques to build on optimal or near-optimal layouts.<n>We synthesize a one-dimensional shuttling bus architecture for the rotated surface code, leveraging coherent spin-qubit shuttling.<n>We show that the proposed design can sustain logical error rates as low as $2cdot 10-10$ per round at code distance 21.
Score: 1.62107954358883
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: As quantum computers scale toward millions of physical qubits, it becomes essential to robustly encode individual logical qubits to ensure fault tolerance under realistic noise. A high-quality foundational encoding allows future compilation techniques and heuristics to build on optimal or near-optimal layouts, improving scalability and error resilience. In this work, we synthesize a one-dimensional shuttling bus architecture for the rotated surface code, leveraging coherent spin-qubit shuttling. We formulate a mixed-integer optimization model that yields optimal solutions with relatively low execution time for small code distances, and propose a scalable heuristic that matches optimal results while maintaining linear computational complexity. We evaluate the synthesized architecture using architectural metrics, such as shuttling distance and cycle time, and full quantum simulations under realistic noise models, showing that the proposed design can sustain logical error rates as low as $2\cdot 10^{-10}$ per round at code distance 21, showcasing its feasibility for scalable quantum error correction in spin-based quantum processors.

Related papers

SAQ: Stabilizer-Aware Quantum Error Correction Decoder [8.458339111154585]
Quantum Error Correction (QEC) decoding faces a fundamental accuracy-efficiency tradeoff.<n>Recent neural decoders reduce complexity but lack the accuracy needed to compete with computationally expensive classical methods.<n>We introduce SAQ-Decoder, a framework combining transformer-based learning with constraint post-processing.
arXiv Detail & Related papers (2025-12-09T18:51:35Z)
Dependency-Aware Compilation for Surface Code Quantum Architectures [7.543907169342984]
We study the problem of compiling quantum circuits for quantum computers implementing surface codes.<n>We solve this problem efficiently and near-optimally with a novel algorithm.<n>Our evaluation shows that our approach is powerful and flexible for compiling realistic workloads.
arXiv Detail & Related papers (2023-11-29T19:36:19Z)
Optimizing quantum gates towards the scale of logical qubits [78.55133994211627]
A foundational assumption of quantum gates theory is that quantum gates can be scaled to large processors without exceeding the error-threshold for fault tolerance. Here we report on a strategy that can overcome such problems. We demonstrate it by choreographing the frequency trajectories of 68 frequency-tunablebits to execute single qubit while superconducting errors.
arXiv Detail & Related papers (2023-08-04T13:39:46Z)
The END: An Equivariant Neural Decoder for Quantum Error Correction [73.4384623973809]
We introduce a data efficient neural decoder that exploits the symmetries of the problem. We propose a novel equivariant architecture that achieves state of the art accuracy compared to previous neural decoders.
arXiv Detail & Related papers (2023-04-14T19:46:39Z)
Deep Quantum Error Correction [73.54643419792453]
Quantum error correction codes (QECC) are a key component for realizing the potential of quantum computing. In this work, we efficiently train novel emphend-to-end deep quantum error decoders. The proposed method demonstrates the power of neural decoders for QECC by achieving state-of-the-art accuracy.
arXiv Detail & Related papers (2023-01-27T08:16:26Z)
A Hybrid Quantum-Classical Algorithm for Robust Fitting [47.42391857319388]
We propose a hybrid quantum-classical algorithm for robust fitting. Our core contribution is a novel robust fitting formulation that solves a sequence of integer programs. We present results obtained using an actual quantum computer.
arXiv Detail & Related papers (2022-01-25T05:59:24Z)
Scaling Quantum Approximate Optimization on Near-term Hardware [49.94954584453379]
We quantify scaling of the expected resource requirements by optimized circuits for hardware architectures with varying levels of connectivity. We show the number of measurements, and hence total time to synthesizing solution, grows exponentially in problem size and problem graph degree. These problems may be alleviated by increasing hardware connectivity or by recently proposed modifications to the QAOA that achieve higher performance with fewer circuit layers.
arXiv Detail & Related papers (2022-01-06T21:02:30Z)
Space-efficient binary optimization for variational computing [68.8204255655161]
We show that it is possible to greatly reduce the number of qubits needed for the Traveling Salesman Problem. We also propose encoding schemes which smoothly interpolate between the qubit-efficient and the circuit depth-efficient models.
arXiv Detail & Related papers (2020-09-15T18:17:27Z)
Optimal Layout Synthesis for Quantum Computing [9.530683922512873]
layout synthesis, which transforms quantum programs to meet hardware limitations, is a crucial step in the realization of quantum computing. We present two synthesizers, one optimal and one approximate but nearly optimal. The key to this success is a more efficient spacetime-based variable encoding of the layout synthesis problem as a mathematical programming problem.
arXiv Detail & Related papers (2020-07-30T18:05:56Z)
Compilation of Fault-Tolerant Quantum Heuristics for Combinatorial Optimization [0.14755786263360526]
We explore which quantum algorithms for optimization might be most practical to try out on a small fault-tolerant quantum computer. Our results discourage the notion that any quantum optimization realizing only a quadratic speedup will achieve an advantage over classical algorithms.
arXiv Detail & Related papers (2020-07-14T22:54:04Z)

This list is automatically generated from the titles and abstracts of the papers in this site.