Krylov complexity of fermion chain in double-scaled SYK and power spectrum perspective
- URL: http://arxiv.org/abs/2407.13293v1
- Date: Thu, 18 Jul 2024 08:47:05 GMT
- Title: Krylov complexity of fermion chain in double-scaled SYK and power spectrum perspective
- Authors: Takanori Anegawa, Ryota Watanabe,
- Abstract summary: We investigate Krylov complexity of the fermion chain operator which consists of multiple Majorana fermions in the double-scaled SYK (DSSYK) model with finite temperature.
Using the fact that Krylov complexity is computable from two-point functions, the analysis is performed in the limit where the two-point function becomes simple.
We confirm the exponential growth of Krylov complexity in the very low temperature regime.
- Score: 0.0
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: We investigate Krylov complexity of the fermion chain operator which consists of multiple Majorana fermions in the double-scaled SYK (DSSYK) model with finite temperature. Using the fact that Krylov complexity is computable from two-point functions, the analysis is performed in the limit where the two-point function becomes simple and we compare the results with those of other previous studies. We confirm the exponential growth of Krylov complexity in the very low temperature regime. In general, Krylov complexity grows at most linearly at very late times in any system with a bounded energy spectrum. Therefore, we have to focus on the initial growth to see differences in the behaviors of systems or operators. Since the DSSYK model is such a bounded system, its chaotic nature can be expected to appear as the initial exponential growth of the Krylov complexity. In particular, the time at which the initial exponential growth of Krylov complexity terminates is independent of the number of degrees of freedom. Based on the above, we systematically and specifically study the Lanczos coefficients and Krylov complexity using a toy power spectrum and deepen our understanding of those initial behaviors. In particular, we confirm that the overall sech-like behavior of the power spectrum shows the initial linear growth of the Lanczos coefficient, even when the energy spectrum is bounded.
Related papers
- Information scrambling and entanglement dynamics in Floquet Time Crystals [49.1574468325115]
We study the dynamics of out-of-time-ordered correlators (OTOCs) and entanglement of entropy as measures of information propagation in disordered systems.
arXiv Detail & Related papers (2024-11-20T17:18:42Z) - KPZ scaling from the Krylov space [83.88591755871734]
Recently, a superdiffusion exhibiting the Kardar-Parisi-Zhang scaling in late-time correlators and autocorrelators has been reported.
Inspired by these results, we explore the KPZ scaling in correlation functions using their realization in the Krylov operator basis.
arXiv Detail & Related papers (2024-06-04T20:57:59Z) - Operator dynamics in Lindbladian SYK: a Krylov complexity perspective [0.0]
We analytically establish the linear growth of two sets of coefficients for any generic jump operators.
We find that the Krylov complexity saturates inversely with the dissipation strength, while the dissipative timescale grows logarithmically.
arXiv Detail & Related papers (2023-11-01T18:00:06Z) - Krylov complexity in the IP matrix model II [0.0]
We study how the Krylov complexity changes from a zero-temperature oscillation to an infinite-temperature exponential growth.
The IP model for any nonzero temperature shows exponential growth for the Krylov complexity even though the Green function decays by a power law in time.
arXiv Detail & Related papers (2023-08-15T04:25:55Z) - Krylov complexity in quantum field theory, and beyond [44.99833362998488]
We study Krylov complexity in various models of quantum field theory.
We find that the exponential growth of Krylov complexity satisfies the conjectural inequality, which generalizes the Maldacena-Shenker-Stanford bound on chaos.
arXiv Detail & Related papers (2022-12-29T19:00:00Z) - Krylov complexity in saddle-dominated scrambling [0.0]
In semi-classical systems, the exponential growth of the out-of-time order correlator (OTOC) is believed to be the hallmark of quantum chaos.
In this work, we probe such an integrable system exhibiting saddle dominated scrambling through Krylov complexity and the associated Lanczos coefficients.
arXiv Detail & Related papers (2022-03-07T17:29:24Z) - Genuine Multipartite Correlations in a Boundary Time Crystal [56.967919268256786]
We study genuine multipartite correlations (GMC's) in a boundary time crystal (BTC)
We analyze both (i) the structure (orders) of GMC's among the subsystems, as well as (ii) their build-up dynamics for an initially uncorrelated state.
arXiv Detail & Related papers (2021-12-21T20:25:02Z) - Krylov complexity of many-body localization: Operator localization in
Krylov basis [0.0]
We study the operator growth problem and its complexity in the many-body localization (MBL) system from the Lanczos perspective.
Using the Krylov basis, the operator growth problem can be viewed as a single-particle hopping problem on a semi-infinite chain.
Our numerical results suggest that the emergent single-particle hopping problem in the MBL system is localized when on the first site.
arXiv Detail & Related papers (2021-12-09T06:50:19Z) - Observation of Time-Crystalline Eigenstate Order on a Quantum Processor [80.17270167652622]
Quantum-body systems display rich phase structure in their low-temperature equilibrium states.
We experimentally observe an eigenstate-ordered DTC on superconducting qubits.
Results establish a scalable approach to study non-equilibrium phases of matter on current quantum processors.
arXiv Detail & Related papers (2021-07-28T18:00:03Z) - Out-of-time-order correlations and the fine structure of eigenstate
thermalisation [58.720142291102135]
Out-of-time-orderors (OTOCs) have become established as a tool to characterise quantum information dynamics and thermalisation.
We show explicitly that the OTOC is indeed a precise tool to explore the fine details of the Eigenstate Thermalisation Hypothesis (ETH)
We provide an estimation of the finite-size scaling of $omega_textrmGOE$ for the general class of observables composed of sums of local operators in the infinite-temperature regime.
arXiv Detail & Related papers (2021-03-01T17:51:46Z) - Operator complexity: a journey to the edge of Krylov space [0.0]
Krylov complexity, or K-complexity', quantifies this growth with respect to a special basis.
We study the evolution of K-complexity in finite-entropy systems for time scales greater than the scrambling time.
arXiv Detail & Related papers (2020-09-03T18:10:20Z)
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.