# A remark on the notion of independence of quantum integrals of motion in   the thermodynamic limit

**Authors:** Oleg Lychkovskiy

arXiv: 1812.04601 · 2020-02-18

## TL;DR

This paper critiques the standard definition of independence of quantum integrals of motion in many-body systems, proposes a new definition, and clarifies the integrability status of the PXP model.

## Contribution

It introduces a revised definition of quantum integrals of motion independence, resolving ambiguities in the assessment of quantum integrability.

## Key findings

- The common definition overestimates independent QIMs in the PXP model.
- A new definition clarifies the true integrability of the system.
- The study impacts the understanding of quantum integrability criteria.

## Abstract

Studies of integrable quantum many-body systems have a long history with an impressive record of success. However, surprisingly enough, an unambiguous definition of quantum integrability remains a matter of an ongoing debate. We contribute to this debate by dwelling upon an important aspect of quantum integrability -- the notion of independence of quantum integrals of motion (QIMs). We point out that a widely accepted definition of functional independence of QIMs is flawed, and suggest a new definition. Our study is motivated by the PXP model -- a model of $N$ spins $1/2$ possessing an extensive number of binary QIMs. The number of QIMs which are independent according to the common definition turns out to be equal to the number of spins, $N$. A common wisdom would then suggest that the system is completely integrable, which is not the case. We discuss the origin of this conundrum and demonstrate how it is resolved when a new definition of independence of QIMs is employed.

## Full text

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## References

36 references — full list in the complete paper: https://tomesphere.com/paper/1812.04601/full.md

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Source: https://tomesphere.com/paper/1812.04601