# Insulators and metals with topological order and discrete symmetry   breaking

**Authors:** Shubhayu Chatterjee, Subir Sachdev

arXiv: 1703.00014 · 2017-05-31

## TL;DR

This paper develops a theory where topological order coexists with discrete symmetry breaking in insulators and metals, explaining pseudogap phenomena and symmetry behaviors in high-temperature cuprates.

## Contribution

It extends existing topological order theories to include coexistence with discrete symmetry breaking, providing a unified explanation for pseudogap and symmetry phenomena in cuprates.

## Key findings

- Translationally-invariant states with topological order coexist with Ising-nematic order.
- The theory explains why broken symmetries vanish without a pseudogap at high doping.
- Optimal doping criticality relates to the loss of topological order.

## Abstract

Numerous experiments have reported discrete symmetry breaking in the high temperature pseudogap phase of the hole-doped cuprates, including breaking of one or more of lattice rotation, inversion, or time-reversal symmetries. In the absence of translational symmetry breaking or topological order, these conventional order parameters cannot explain the gap in the charged fermion excitation spectrum in the anti-nodal region. Zhao et al. (1601.01688) and Jeong et al. (arXiv:1701.06485) have also reported inversion and time-reversal symmetry breaking in insulating Sr2IrO4 similar to that in the metallic cuprates, but co-existing with Neel order. We extend an earlier theory of topological order in insulators and metals, in which the topological order combines naturally with the breaking of these conventional discrete symmetries. We find translationally-invariant states with topological order co-existing with both Ising-nematic order and spontaneous charge currents. The link between the discrete broken symmetries and the topological-order-induced pseudogap explains why the broken symmetries do not survive in the confining phases without a pseudogap at large doping. Our theory also connects to the O(3) non-linear sigma model and CP1 descriptions of quantum fluctuations of the Neel order. In this framework, the optimal doping criticality of the cuprates is primarily associated with the loss of topological order.

## Full text

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## Figures

4 figures with captions in the complete paper: https://tomesphere.com/paper/1703.00014/full.md

## References

65 references — full list in the complete paper: https://tomesphere.com/paper/1703.00014/full.md

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Source: https://tomesphere.com/paper/1703.00014