Related papers: Fourier Neural Operators for Time-Periodic Quantum Systems: Learning Floquet Hamiltonians, Observable Dynamics, and Operator Growth

Fourier Neural Operators for Time-Periodic Quantum Systems: Learning Floquet Hamiltonians, Observable Dynamics, and Operator Growth

URL: http://arxiv.org/abs/2509.07084v1
Date: Mon, 08 Sep 2025 18:00:03 GMT
Title: Fourier Neural Operators for Time-Periodic Quantum Systems: Learning Floquet Hamiltonians, Observable Dynamics, and Operator Growth
Authors: Zihao Qi, Yang Peng, Christopher Earls,
Abstract summary: Time-periodic quantum systems exhibit a rich variety of far-from-equilibrium phenomena and serve as ideal platforms for quantum engineering and control.<n>We introduce Fourier Neural Operators (FNO) as an efficient, accurate, and scalable surrogate for non-equilibrium quantum dynamics.<n>Our results establish FNO as a versatile and scalable surrogate for predicting non-equilibrium quantum dynamics, with potential applications to processing data from near-term quantum computers.
Score: 8.415180820101964
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Time-periodic quantum systems exhibit a rich variety of far-from-equilibrium phenomena and serve as ideal platforms for quantum engineering and control. However, simulating their dynamics with conventional numerical methods remains challenging due to the exponential growth of Hilbert space dimension and rapid spreading of entanglement. In this work, we introduce Fourier Neural Operators (FNO) as an efficient, accurate, and scalable surrogate for non-equilibrium quantum dynamics. Parameterized in Fourier space, FNO naturally captures temporal correlations and remains minimally dependent on discretization of time. We demonstrate the versatility of FNO through three complementary learning paradigms: reconstructing effective Floquet Hamiltonians, predicting expectation values of local observables, and learning quantum information spreading. For each learning task, FNO achieves remarkable accuracy, while attaining a significant speedup, compared to exact numerical methods. Moreover, FNO possesses a remarkable capacity to transfer learning across different temporal discretizations and system driving frequencies. We also show that FNO can extrapolate beyond the time window provided by training data, enabling access to observables and operator-spreading dynamics that might otherwise be difficult to obtain. By employing an appropriate local basis, we argue that the computational cost of FNOs scales only polynomially with the system size. Our results establish FNO as a versatile and scalable surrogate for predicting non-equilibrium quantum dynamics, with potential applications to processing data from near-term quantum computers.

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