Related papers: Graybox characterization and calibration with finite-shot estimation on superconducting-qubit experiments

Graybox characterization and calibration with finite-shot estimation on superconducting-qubit experiments

URL: http://arxiv.org/abs/2508.12822v1
Date: Mon, 18 Aug 2025 11:04:48 GMT
Title: Graybox characterization and calibration with finite-shot estimation on superconducting-qubit experiments
Authors: Poramet Pathumsoot, Areeya Chantasri, Michal Hajdušek, Rodney Van Meter,
Abstract summary: We describe an explicit (whitebox) model describing the known dynamics and an implicit (blackbox) model describing the noisy dynamics in the form of a deep neural network.<n>By sending a set of selected pulses to the devices and measuring Pauli expectation values, the Graybox approach can train the implicit model and optimize gates.<n>We benchmark our optimized gates on the devices and cross-testing predictive models with two types of loss functions.
Score: 0.44998333629984877
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Characterization and calibration of quantum devices are necessary steps to achieve fault-tolerant quantum computing. As quantum devices become more sophisticated, it is increasingly essential to rely not only on physics-based models, but also on predictive models with open-loop optimization. Therefore, we choose the Graybox approach, which is composed of an explicit (whitebox) model describing the known dynamics and an implicit (blackbox) model describing the noisy dynamics in the form of a deep neural network, to characterize and calibrate superconducting-qubit devices. By sending a set of selected pulses to the devices and measuring Pauli expectation values, the Graybox approach can train the implicit model and optimize gates based on specified loss functions. We also benchmark our optimized gates on the devices and cross-testing predictive models with two types of loss functions, i.e., the mean squared errors (MSE) of expectation values and the absolute errors (AE) of average gate fidelities (AGF). While the Graybox method allows for flexibility of the implicit noise model, its construction relies on a finite measurement shots dataset. We thus apply the decomposition of expected MSE loss to show that the finite-shot estimation of expectation values is the main contribution to the minimum value achievable of the expected MSE loss. We also show that the expected loss is an upper bound of the expected absolute error of AGF between the exact value and model prediction. Our results provide insights for quantum device characterization and gate optimization in experiments where only finite shots of data are available.

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