Topological classification for chiral symmetry with non-equal sublattices

TL;DR

This paper develops a comprehensive topological classification for systems with chiral symmetry on bipartite lattices with unequal sublattices, extending to include $\\ ext{PT}$ symmetry and applying to Moiré systems and lattice models.

Contribution

It introduces a classification framework based on Stiefel manifolds for chiral symmetry with non-equal sublattices, including $\\text{PT}$ symmetry, and applies it to physical models.

Findings

Classifying spaces are identified as Stiefel manifolds.

Derived a topological classification table for these systems.

Applied the theory to $\\text{PT}$-invariant Moiré systems and lattice models.

Abstract

Chiral symmetry on bipartite lattices with different numbers of $A$-sites and $B$-sites is exceptional in condensed matter, as it gives rise to zero-energy flat bands. Crystalline systems featuring chiral symmetry with non-equal sublattices include Lieb lattices, dice lattices, and particularly Moir\'e systems, where interaction converts the flat bands into fascinating many-body phases. In this work, we present a comprehensive classification theory for chiral symmetry with non-equal sublattices. First, we identify the classifying spaces as Stiefel manifolds and derive the topological classification table. Then, we extend the symmetry by taking $\mathcal{PT}$ symmetry into account, and ultimately obtain three symmetry classes corresponding to complex, real, and quaternionic Stiefel manifolds, respectively. Finally, we apply our theory to clarify the topological invariant for $\mathcal{PT}$-invariant Moir\'e systems and construct physical models with Lieb and dice lattice structures to demonstrate our theory. Our work establishes the theoretical foundation of topological phases protected by chiral symmetries with non-equal sublattices.