English

Linear-Size QAC0 Channels: Learning, Testing and Hardness

Quantum Physics 2025-11-11 v2

Abstract

Shallow quantum circuits have attracted increasing attention in recent years, due to the fact that current noisy quantum hardware can only perform faithful quantum computation for a short amount of time. The constant-depth quantum circuits QAC0\mathbf{QAC}^0, a quantum counterpart of AC0\mathbf{AC}^0 circuits, are the polynomial-size and constant-depth quantum circuits composed of only single-qubit unitaries and polynomial-size generalized Toffoli gates. The computational power of QAC0\mathbf{QAC}^0 has been extensively investigated in recent years. In this paper, we are concerned with QLC0\mathbf{QLC}^0 circuits, which are linear-size QAC0\mathbf{QAC}^0 circuits, a quantum counterpart of LC0\mathbf{LC}^0. * We show that depth-dd QAC0\mathbf{QAC}^0 circuits working on nn input qubits and aa ancilla qubits have approximate degree at most O~((n+a)12d)\tilde{O}((n+a)^{1-2^{-d}}), improving the O~((n+a)13d)\tilde{O}((n+a)^{1-3^{-d}}) degree upper bound of previous works. Consequently, this directly implies that to compute the parity function, QAC0\mathbf{QAC}^0 circuits need at least O~(n1+2d)\tilde{O}(n^{1+2^{-d}}) circuit size. * We present the first agnostic learning algorithm for QLC0\mathbf{QLC}^0 channels using subexponential running time and queries. Moreover, we also establish exponential lower bounds on the query complexity of learning QAC0\mathbf{QAC}^0 channels under both the spectral norm distance of the Choi matrix and the diamond norm distance. * We present a tolerant testing algorithm which determines whether an unknown quantum channel is a QLC0\mathbf{QLC}^0 channel. This tolerant testing algorithm is based on our agnostic learning algorithm. Our approach leverages low-degree approximations of QAC0\mathbf{QAC}^0 circuits and Pauli analysis as key technical tools. Collectively, these results advance our understanding of agnostic learning for shallow quantum circuits.

Keywords

Cite

@article{arxiv.2510.00593,
  title  = {Linear-Size QAC0 Channels: Learning, Testing and Hardness},
  author = {Yangjing Dong and Fengning Ou and Penghui Yao},
  journal= {arXiv preprint arXiv:2510.00593},
  year   = {2025}
}
R2 v1 2026-07-01T06:09:49.368Z