Related papers: Zero-Noise Extrapolation via Cyclic Permutations of Quantum Circuit Layouts

Zero-Noise Extrapolation via Cyclic Permutations of Quantum Circuit Layouts

URL: http://arxiv.org/abs/2511.02901v1
Date: Tue, 04 Nov 2025 19:00:00 GMT
Title: Zero-Noise Extrapolation via Cyclic Permutations of Quantum Circuit Layouts
Authors: Zahar Sayapin, Daniil Rabinovich, Nikita Korolev, Kirill Lakhmanskiy,
Abstract summary: We propose a Cyclic Layout Permutations based Zero Noise Extrapolation (CLP-ZNE) protocol for such a task.<n>The method exploits symmetries of quantum circuits with one-dimensional connectivity to extrapolate the expectation value, averaged over cyclic circuit layout permutations, to the level of zero noise.<n>When benchmarked against noise channels modeling the IBM Torino quantum computer, the method reduces a typical expectation value error by an order of magnitude depending on the protocol specifications.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Increasing the utility of currently available Noisy Intermediate-Scale Quantum (NISQ) devices requires developing efficient methods to mitigate hardware errors, taking into account the constraints of these devices such as medium number of qubits and limited connectivity between them. In this work we propose a novel Cyclic Layout Permutations based Zero Noise Extrapolation (CLP-ZNE) protocol for such a task. The method leverages the inherent non-uniformity of gate errors in NISQ hardware and exploits symmetries of quantum circuits with one-dimensional connectivity to extrapolate the expectation value, averaged over cyclic circuit layout permutations, to the level of zero noise. In contrast to the previous layout permutation based approaches, for $n$ qubit circuit CLP-ZNE requires measurements of only $O(n)$ different circuit layouts to reconstruct the noiseless expected value. When benchmarked against noise channels modeling the IBM Torino quantum computer, the method reduces a typical expectation value error by an order of magnitude, depending on the protocol specifications. By employing a noise model derived from real hardware specifications, including both depolarizing and $T_1/T_2$ relaxation processes, these results give evidence for the applicability of CLP-ZNE to present-day NISQ processors.

Related papers

Variational quantum algorithms with invariant probabilistic error cancellation on noisy quantum processors [13.51474348538291]
We propose a novel noise-adaptable strategy that combines PEC with the quantum approximate optimization algorithm (QAOA)<n>We experimentally validated this technique on a superconducting quantum processor, cutting sampling cost by 90.1%.<n>These results open promising avenues for executing VQAs with large-scale, low-noise quantum circuits, paving the way for practical quantum computing advancements.
arXiv Detail & Related papers (2025-06-08T08:25:47Z)
Prospects of Quantum Error Mitigation for Quantum Signal Processing [0.0]
This work explores the performance of zero-noise-extrapolation (ZNE) on a Hamiltonian simulation algorithm designed within quantum signal processing (QSP)<n>We quantify for which noise and depth regimes our ZNE protocol can recover an approximation of the noiseless expectation value.<n>We briefly discuss and present a numerical study on the region where ZNE is unusable, even given an unlimited sample budget.
arXiv Detail & Related papers (2025-05-08T19:49:54Z)
A Useful Metric for the NISQ Era: Qubit Error Probability and Its Role in Zero Noise Extrapolation [0.0]
We propose the qubit error probability (QEP), a device specific metric that combines relaxation, dephasing, gate, and measurement contributions into a single per qubit figure of merit computable before execution.<n>In regimes where the raw circuits exhibit a finite mean QEP, the method suppresses observable errors beyond those attainable with circuit depth scaled ZNE.<n>These results demonstrate that QEP serves as a transparent and efficient error metric, and that its integration into ZNE provides a practical route to reliability gains on current superconducting hardware.
arXiv Detail & Related papers (2025-03-13T09:42:03Z)
Quantum Compiling with Reinforcement Learning on a Superconducting Processor [55.135709564322624]
We develop a reinforcement learning-based quantum compiler for a superconducting processor. We demonstrate its capability of discovering novel and hardware-amenable circuits with short lengths. Our study exemplifies the codesign of the software with hardware for efficient quantum compilation.
arXiv Detail & Related papers (2024-06-18T01:49:48Z)
Noisy Quantum Simulation: Performance and Resource Considerations for the Tavis-Cummings and Heisenberg Models [0.0]
Fault-tolerant quantum computers promise the simulation of complex quantum systems beyond the reach of classical computation.<n>Two techniques addressing these challenges are zero-noise extrapolation (ZNE) and incremental structural learning (ISL)<n>ZNE and ISL are benchmarked for simulating the Trotterized time evolution of two models: the Tavis-Cummings model (TCM) and the Heisenberg spin chain (HSC)<n>Results indicate that ISL performs more favorably in HSC systems, consistently surpassing ZNE in expectation value accuracy.
arXiv Detail & Related papers (2024-02-26T16:06:24Z)
Fault-tolerant quantum architectures based on erasure qubits [49.227671756557946]
We exploit the idea of erasure qubits, relying on an efficient conversion of the dominant noise into erasures at known locations. We propose and optimize QEC schemes based on erasure qubits and the recently-introduced Floquet codes. Our results demonstrate that, despite being slightly more complex, QEC schemes based on erasure qubits can significantly outperform standard approaches.
arXiv Detail & Related papers (2023-12-21T17:40:18Z)
Mitigating crosstalk errors by randomized compiling: Simulation of the BCS model on a superconducting quantum computer [41.94295877935867]
Crosstalk errors, stemming from CNOT two-qubit gates, are a crucial source of errors on numerous quantum computing platforms. We develop and apply an extension of the randomized compiling protocol that includes a special treatment of neighboring qubits. Our twirling of neighboring qubits is shown to dramatically improve the noise estimation protocol without the need to add new qubits or circuits.
arXiv Detail & Related papers (2023-05-03T18:00:02Z)
Error Mitigation-Aided Optimization of Parameterized Quantum Circuits: Convergence Analysis [42.275148861039895]
Variational quantum algorithms (VQAs) offer the most promising path to obtaining quantum advantages via noisy processors. gate noise due to imperfections and decoherence affects the gradient estimates by introducing a bias. Quantum error mitigation (QEM) techniques can reduce the estimation bias without requiring any increase in the number of qubits. QEM can reduce the number of required iterations, but only as long as the quantum noise level is sufficiently small.
arXiv Detail & Related papers (2022-09-23T10:48:04Z)
Data post-processing for the one-way heterodyne protocol under composable finite-size security [62.997667081978825]
We study the performance of a practical continuous-variable (CV) quantum key distribution protocol. We focus on the Gaussian-modulated coherent-state protocol with heterodyne detection in a high signal-to-noise ratio regime. This allows us to study the performance for practical implementations of the protocol and optimize the parameters connected to the steps above.
arXiv Detail & Related papers (2022-05-20T12:37:09Z)
Extending quantum probabilistic error cancellation by noise scaling [1.2891210250935146]
We propose a general framework for quantum error mitigation that combines and generalizes two techniques: probabilistic error cancellation (PEC) and zero-noise extrapolation (ZNE) PEC represents ideal operations as linear combinations of noisy operations that are implementable on hardware. ZNE is used to better approximate the zero-noise limit.
arXiv Detail & Related papers (2021-08-04T18:30:51Z)
Composably secure data processing for Gaussian-modulated continuous variable quantum key distribution [58.720142291102135]
Continuous-variable quantum key distribution (QKD) employs the quadratures of a bosonic mode to establish a secret key between two remote parties. We consider a protocol with homodyne detection in the general setting of composable finite-size security. In particular, we analyze the high signal-to-noise regime which requires the use of high-rate (non-binary) low-density parity check codes.
arXiv Detail & Related papers (2021-03-30T18:02:55Z)
Machine learning of noise-resilient quantum circuits [0.8258451067861933]
Noise mitigation and reduction will be crucial for obtaining useful answers from near-term quantum computers. We present a general framework based on machine learning for reducing the impact of quantum hardware noise on quantum circuits. Our method, called noise-aware circuit learning (NACL), applies to circuits designed to compute a unitary transformation, prepare a set of quantum states, or estimate an observable of a many-qubit state.
arXiv Detail & Related papers (2020-07-02T15:43:32Z)

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