Add to ORKGWe study flat bands and their topology in 2D materials with quadratic band crossing points (QBCPs) under periodic strain. In contrast to Dirac points in graphene, where strain acts as a vector potential, strain for QBCPs serves as a director potential with angular momentum $\ell=2$. We prove that when the strengths of the strain fields hit certain ``magic" values, exact flat bands with $C=\pm 1$ emerge at charge neutrality point in the chiral limit, in strong analogy to magic angle twisted bilayer graphene. These flat bands have ideal quantum geometry for the realization of fractional Chern insulators, and they are always fragile topological. The number of flat bands can be doubled for certain point group, and the interacting Hamiltonian is...
The chiral Hamiltonian for twisted graphene bilayers is written as a $2\times2$ matrix operator by a...
Electrons with large kinetic energy have a superconducting instability for infinitesimal attractive ...
Moir\'e systems have emerged in recent years as a rich platform to study strong correlations. Here, ...
We study the influence of spatial symmetries on the appearance and the number of exact flat bands (F...
We consider twisted bilayer graphene on a transition metal dichalcogenide substrate, where proximity...
We consider twisted bilayer graphene on a transition metal dichalcogenide substrate, where proximity...
Magic-angle twisted bilayer graphene has received a lot of interest due to its flat bands with poten...
Magic-angle twisted bilayer graphene has received a lot of interest due to its flat bands with poten...
We consider twisted bilayer graphene on a transition metal dichalcogenide substrate, where proximity...
Magic-angle twisted bilayer graphene has received a lot of interest due to its flat bands with poten...
The discovery of correlated phases in twisted moiré superlattices accelerated the search for low-di...
We propose models of twisted multilayer graphene that exhibit exactly flat Bloch bands with arbitrar...
Studies of twisted moir\'e systems have been mainly focused on two-dimensional (2D) materials such a...
Electrons with large kinetic energy have a superconducting instability for infinitesimal attractive ...
Electrons with large kinetic energy have a superconducting instability for infinitesimal attractive ...
The chiral Hamiltonian for twisted graphene bilayers is written as a $2\times2$ matrix operator by a...
Electrons with large kinetic energy have a superconducting instability for infinitesimal attractive ...
Moir\'e systems have emerged in recent years as a rich platform to study strong correlations. Here, ...
We study the influence of spatial symmetries on the appearance and the number of exact flat bands (F...
We consider twisted bilayer graphene on a transition metal dichalcogenide substrate, where proximity...
We consider twisted bilayer graphene on a transition metal dichalcogenide substrate, where proximity...
Magic-angle twisted bilayer graphene has received a lot of interest due to its flat bands with poten...
Magic-angle twisted bilayer graphene has received a lot of interest due to its flat bands with poten...
We consider twisted bilayer graphene on a transition metal dichalcogenide substrate, where proximity...
Magic-angle twisted bilayer graphene has received a lot of interest due to its flat bands with poten...
The discovery of correlated phases in twisted moiré superlattices accelerated the search for low-di...
We propose models of twisted multilayer graphene that exhibit exactly flat Bloch bands with arbitrar...
Studies of twisted moir\'e systems have been mainly focused on two-dimensional (2D) materials such a...
Electrons with large kinetic energy have a superconducting instability for infinitesimal attractive ...
Electrons with large kinetic energy have a superconducting instability for infinitesimal attractive ...
The chiral Hamiltonian for twisted graphene bilayers is written as a $2\times2$ matrix operator by a...
Electrons with large kinetic energy have a superconducting instability for infinitesimal attractive ...
Moir\'e systems have emerged in recent years as a rich platform to study strong correlations. Here, ...