Diagnosing Quantum Circuits: Noise Robustness, Trainability, and Expressibility
- URL: http://arxiv.org/abs/2509.11307v1
- Date: Sun, 14 Sep 2025 14:56:43 GMT
- Title: Diagnosing Quantum Circuits: Noise Robustness, Trainability, and Expressibility
- Authors: Yuguo Shao, Zhengyu Chen, Zhaohui Wei, Zhengwei Liu,
- Abstract summary: 2MC-OBPPP is an efficient, hardware-independent tool for pre-execution circuit evaluation.<n>Applying this map to a specific circuit, we show that implementing interventions on fewer than 2% of the qubits is sufficient to up to 90% of errors.
- Score: 4.593875150231198
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: Parameterized quantum circuits are central to near-term quantum algorithms, and serve as the foundation for many quantum machine learning frameworks, which should be robust to noise, maintain trainability, and exhibit sufficient expressibility. Here we introduce 2MC-OBPPP, a polynomial-time classical estimator that quantifies the three aforementioned diagnostics for a given parameterized quantum circuit. As a demonstration of the power of our approach, we show that moderate amplitude damping noise can reduce the severity of vanishing gradients, but at the cost of lowered expressibility. In particular, our approach can yield a spatiotemporal "noise-hotspot" map that pinpoints the most noise-sensitive qubits/gates in parameterized quantum circuits. Applying this map to a specific circuit, we show that implementing interventions on fewer than 2% of the qubits is sufficient to mitigate up to 90% of the errors. Therefore, 2MC-OBPPP is not only an efficient, hardware-independent tool for pre-execution circuit evaluation but also enables targeted strategies that significantly reduce the cost of noise suppression.
Related papers
- Classical Noise Inversion: A Practical and Optimal framework for Robust Quantum Applications [5.425954380993698]
Quantum error mitigation is a critical technology for extracting reliable computations from noisy quantum processors.<n>It is hampered by the expansive cost of sampling from quantum circuits and the reliance on unrealistic assumptions, such as gate-independent noise.<n>Here, we introduce Classical Noise Inversion (CNI), a framework that fundamentally bypasses these crucial limitations and is well-suited for various quantum applications.
arXiv Detail & Related papers (2025-10-23T15:59:04Z) - Provably Robust Training of Quantum Circuit Classifiers Against Parameter Noise [49.97673761305336]
Noise remains a major obstacle to achieving reliable quantum algorithms.<n>We present a provably noise-resilient training theory and algorithm to enhance the robustness of parameterized quantum circuit classifiers.
arXiv Detail & Related papers (2025-05-24T02:51:34Z) - Bayesian Quantum Amplitude Estimation [46.03321798937855]
We present BAE, a problem-tailored and noise-aware Bayesian algorithm for quantum amplitude estimation.<n>In a fault tolerant scenario, BAE is capable of saturating the Heisenberg limit; if device noise is present, BAE can dynamically characterize it and self-adapt.<n>We propose a benchmark for amplitude estimation algorithms and use it to test BAE against other approaches.
arXiv Detail & Related papers (2024-12-05T18:09:41Z) - Optimal Quantum Purity Amplification [2.05170973574812]
We present the optimal QPA protocol for general quantum systems and global noise.<n>We provide an efficient implementation of the protocol based on generalized quantum phase estimation.<n> Numerical simulations demonstrate the effectiveness of our protocol applied to quantum simulation of Hamiltonian evolution.
arXiv Detail & Related papers (2024-09-26T17:46:00Z) - Optimal and robust error filtration for quantum information processing [0.0]
Error filtration is a hardware scheme that mitigates noise by exploiting auxiliary qubits and entangling gates.<n>We benchmark our approach against figures of merit that correspond to different applications.
arXiv Detail & Related papers (2024-09-02T17:58:44Z) - Lindblad-like quantum tomography for non-Markovian quantum dynamical maps [46.350147604946095]
We introduce Lindblad-like quantum tomography (L$ell$QT) as a quantum characterization technique of time-correlated noise in quantum information processors.<n>We discuss L$ell$QT for the dephasing dynamics of single qubits in detail, which allows for a neat understanding of the importance of including multiple snapshots of the quantum evolution in the likelihood function.
arXiv Detail & Related papers (2024-03-28T19:29:12Z) - Power Characterization of Noisy Quantum Kernels [52.47151453259434]
We show that noise may make quantum kernel methods to only have poor prediction capability, even when the generalization error is small.
We provide a crucial warning to employ noisy quantum kernel methods for quantum computation.
arXiv Detail & Related papers (2024-01-31T01:02:16Z) - QuantumSEA: In-Time Sparse Exploration for Noise Adaptive Quantum
Circuits [82.50620782471485]
QuantumSEA is an in-time sparse exploration for noise-adaptive quantum circuits.
It aims to achieve two key objectives: (1) implicit circuits capacity during training and (2) noise robustness.
Our method establishes state-of-the-art results with only half the number of quantum gates and 2x time saving of circuit executions.
arXiv Detail & Related papers (2024-01-10T22:33:00Z) - Near-Term Distributed Quantum Computation using Mean-Field Corrections
and Auxiliary Qubits [77.04894470683776]
We propose near-term distributed quantum computing that involve limited information transfer and conservative entanglement production.
We build upon these concepts to produce an approximate circuit-cutting technique for the fragmented pre-training of variational quantum algorithms.
arXiv Detail & Related papers (2023-09-11T18:00:00Z) - Scalable noisy quantum circuits for biased-noise qubits [37.69303106863453]
We consider biased-noise qubits affected only by bit-flip errors, which is motivated by existing systems of stabilized cat qubits.
For realistic noise models, phase-flip will not be negligible, but in the Pauli-Twirling approximation, we show that our benchmark could check the correctness of circuits containing up to $106$ gates.
arXiv Detail & Related papers (2023-05-03T11:27:50Z) - Pulse-efficient quantum machine learning [0.0]
We investigate the impact of pulse-efficient circuits on quantum machine learning algorithms.
We find that pulse-efficient transpilation vastly reduces average circuit durations.
We conclude by applying pulse-efficient transpilation to the Hamiltonian Variational Ansatz and show that it delays the onset of noise-induced barren plateaus.
arXiv Detail & Related papers (2022-11-02T18:00:01Z) - Efficient and robust certification of genuine multipartite entanglement
in noisy quantum error correction circuits [58.720142291102135]
We introduce a conditional witnessing technique to certify genuine multipartite entanglement (GME)
We prove that the detection of entanglement in a linear number of bipartitions by a number of measurements scales linearly, suffices to certify GME.
We apply our method to the noisy readout of stabilizer operators of the distance-three topological color code and its flag-based fault-tolerant version.
arXiv Detail & Related papers (2020-10-06T18:00:07Z)
This list is automatically generated from the titles and abstracts of the papers in this site.
This site does not guarantee the quality of this site (including all information) and is not responsible for any consequences.