# Gapped momentum states

**Authors:** Matteo Baggioli, Vadim Brazhkin, Kostya Trachenko, Mikhail Vasin

arXiv: 1904.01419 · 2020-04-21

## TL;DR

This paper reviews the concept of gapped momentum states (GMS) across various physical systems, highlighting their origins, implications, and experimental evidence, and discusses their theoretical frameworks and applications in different areas of physics.

## Contribution

It provides a comprehensive overview of GMS, connecting their emergence in diverse systems and elucidating the underlying physical principles and models involved.

## Key findings

- GMS emerge in liquids, holographic models, and plasma.
- GMS relate to dissipation and can shift between energy and momentum gaps.
- Experimental evidence supports the existence of GMS in strongly-coupled plasma.

## Abstract

Important properties of a particle, wave or a statistical system depend on the form of a dispersion relation (DR). Two commonly-discussed dispersion relations are the gapless phonon-like DR and the DR with the energy or frequency gap. More recently, the third and intriguing type of DR has been emerging in different areas of physics: the DR with the gap in momentum, or $k$-space. It has been increasingly appreciated that gapped momentum states (GMS) have important implications for dynamical and thermodynamic properties of the system. Here, we review the origin of this phenomenon in a range of physical systems, starting from ordinary liquids to holographic models. We observe how GMS emerge in the Maxwell-Frenkel approach to liquid viscoelasticity, relate the $k$-gap to dissipation and observe how the gaps in DR can continuously change from the energy to momentum space and vice versa. We subsequently discuss how GMS emerge in the two-field description which is analogous to the quantum formulation of dissipation in the Keldysh-Schwinger approach. We discuss experimental evidence for GMS, including the direct evidence of gapped DR coming from strongly-coupled plasma. We also discuss GMS in electromagnetic waves and non-linear Sine-Gordon model. We then move on to discuss the recently developed quasihydrodynamic framework which relates the $k$-gap with the presence of a softly broken global symmetry and its applications. Finally, we review recent discussions of GMS in relativistic hydrodynamics and holographic models. Throughout the review, we point out essential physical ingredients required by GMS to emerge and make links between different areas of physics, with the view that new and deeper understanding will benefit from studying the GMS in seemingly disparate fields and from clarifying the origin of potentially similar underlying physical ideas and equations.

## Full text

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## Figures

30 figures with captions in the complete paper: https://tomesphere.com/paper/1904.01419/full.md

## References

186 references — full list in the complete paper: https://tomesphere.com/paper/1904.01419/full.md

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Source: https://tomesphere.com/paper/1904.01419