Flatband generator in two dimensions
Abstract
Dispersionless bands -- flatbands -- provide an excellent testbed for novel physical phases due to the fine-tuned character of flatband tight-binding Hamiltonians. The accompanying macroscopic degeneracy makes any perturbation relevant, no matter how small. For short-range hoppings flatbands support compact localized states, which allowed to develop systematic flatband generators in d=1 dimension in Phys. Rev. B 95 115135 (2017) and Phys. Rev. B 99 125129 (2019). Here we extend this generator approach to d=2 dimensions. The shape of a compact localized state turns into an important additional flatband classifier. This allows us to obtain analytical solutions for classes of d=2 flatband networks and to re-classify and re-obtain known ones, such as the checkerboard, kagome, Lieb and Tasaki lattices. Our generator can be straightforwardly generalized to three lattice dimensions as well.
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