Chiral Graviton Modes in Fermionic Fractional Chern Insulators

TL;DR

This paper provides a comprehensive theoretical and numerical demonstration of chiral graviton modes in fermionic Fractional Chern Insulators on lattices, showing their existence and stability despite the absence of continuum symmetries.

Contribution

It introduces a lattice stress tensor operator for fermionic Harper-Hofstadter models and demonstrates the adiabatic connection between FQH and FCI graviton modes.

Findings

Chiral graviton modes are long-lived in FCIs.

Lattice stress tensor operators relate to quadrupolar density correlators.

Finite-size analysis shows small intrinsic decay rates for graviton modes.

Abstract

Chiral graviton modes are hallmark collective excitations of Fractional Quantum Hall (FQH) liquids. However, their existence on the lattice, where continuum symmetries that protect them from decay are lost, is still an open and urgent question, especially considering the recent advances in the realization of Fractional Chern Insulators (FCI) in transition metal dichalcogenides and rhombohedral pentalayer graphene. Here we present a comprehensive theoretical and numerical study of graviton-modes in fermionic FCI, and thoroughly demonstrate their existence. We first derive a lattice stress tensor operator in the context of the fermionic Harper-Hofstadter(HH) model which captures the graviton in the flat band limit. Importantly, we discover that such lattice stress-tensor operators are deeply connected to lattice quadrupolar density correlators, readily generalizable to generic Chern bands. We then explicitly show the adiabatic connection between FQH and FCI chiral graviton modes by interpolating from a low flux HH model to a Checkerboard lattice model that hosts a topological flat band. In particular, using state-of-the-art matrix product state and exact diagonalization simulations, we provide strong evidence that chiral graviton modes are long-lived excitations in FCIs despite the lack of continuous symmetries and the scattering with a two-magnetoroton continuum. By means of a careful finite-size analysis, we show that the lattice generates a finite but small intrinsic decay rate for the graviton mode. We discuss the relevance of our results for the exploration of graviton modes in FCI phases realized in solid state settings, as well as cold atom experiments.