Related papers: Quantum Chaos, Randomness and Universal Scaling of Entanglement in Various Krylov Spaces

Quantum Chaos, Randomness and Universal Scaling of Entanglement in Various Krylov Spaces

URL: http://arxiv.org/abs/2407.11822v2
Date: Sat, 18 Oct 2025 03:31:56 GMT
Title: Quantum Chaos, Randomness and Universal Scaling of Entanglement in Various Krylov Spaces
Authors: Hai-Long Shi, Augusto Smerzi, Luca Pezzè,
Abstract summary: We derive an analytical expression for the time-averaged quantum Fisher information (QFI), enabling the detection of scalable multipartite entanglement.<n>Our approach integrates concepts of randomness and quantum chaos, demonstrating that the QFI is universally determined by the structure and dimension of the Krylov space.
Score: 2.8770761243361593
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Multipartite entanglement is a crucial resource for advancing quantum technologies, with considerable research efforts directed toward achieving its rapid and scalable generation. In this work, we derive an analytical expression for the time-averaged quantum Fisher information (QFI), enabling the detection of scalable multipartite entanglement dynamically generated by all quantum chaotic systems governed by Dyson's ensembles. Our approach integrates concepts of randomness and quantum chaos, demonstrating that the QFI is universally determined by the structure and dimension of the Krylov space that confines the chaotic dynamics. In particular, the QFI ranges from $N^2/3$ for $N$ qubits in the permutation-symmetric subspace (e.g. for chaotic kicked top models with long-range interactions), to $N$ when the dynamics extend over the full Hilbert space with or without bit reversal symmetry or parity symmetry (e.g. in chaotic models with short-range Ising-like interactions). In the former case, the QFI reveals multipartite entanglement among $N/3$ qubits and highlights the power of chaotic collective spin systems in generating scalable multipartite entanglement. Interestingly this result can be related to isotropic substructures in the Wigner distribution of chaotic states and demonstrates the efficacy of quantum chaos for Heisenberg-scaling quantum metrology. Finally, our general expression for the QFI agrees with that obtained for random states and, differently from out-of-time-order-correlators, it can also distinguish chaotic from integrable unstable spin dynamics.

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