# Early-Time and Late-Time Quantum Chaos

**Authors:** Chen-Te Ma

arXiv: 1907.04289 · 2020-07-15

## TL;DR

This paper explores the connection between out-of-time-ordered correlators and spectral form factors in bosonic quantum systems, extending to scalar fields and emphasizing the utility of large-N and coherent states for late-time quantum chaos analysis.

## Contribution

It introduces a simplified method using Heisenberg averaging and coherent states to study late-time quantum chaos, and demonstrates large-N techniques' effectiveness in bosonic quantum mechanics.

## Key findings

- Heisenberg averaging relates out-of-time-ordered correlators to spectral form factors.
- Large-N results align with numerical simulations at N=3.
- Coherent states provide a practical approach to probe late-time chaos.

## Abstract

We show the relation between the Heisenberg averaging of regularized 2-point out-of-time ordered correlation function and the 2-point spectral form factor in bosonic quantum mechanics. The generalization to all even-point is also discussed. We also do the direct extension from the bosonic quantum mechanics to the non-interacting scalar field theory. Finally, we find that the coherent state and large-$N$ approaches are useful in the late-time study. We find that the computation of the coherent state can be simplified by the Heisenberg averaging. Therefore, this provides a simplified way to probe the late-time quantum chaos through a coherent state. The large-$N$ result is also comparable to the $N=3$ numerical result in the large-$N$ quantum mechanics. This can justify that large-$N$ technique in bosonic quantum mechanics can probe the late time, not the early time. Because the quantitative behavior of large-$N$ can be captured from the $N=3$ numerical result, the realization in experiments should be possible.

## Full text

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## Figures

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## References

45 references — full list in the complete paper: https://tomesphere.com/paper/1907.04289/full.md

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Source: https://tomesphere.com/paper/1907.04289