A Higher-Order Topological Insulator Phase in a Modulated Haldane Model

Abstract

We explore topological properties of a modulated Haldane model (MHM) in which the strength of the nearest-neighbor and next-nearest-neighbor terms is made unequal and the three-fold rotational symmetry C3 is broken by introducing a trimerization term (|t1w(2w)|< t1s(2s)) in the Hamiltonian. Using the parameter η=t1w/t1s= t2w/t2s, we show that the MHM supports a transition from the quantum anomalous Hall insulator (QAHI) to a HOTI phase at η= 0.5. The MHM also hosts a zero-energy corner mode on a nano-disk that can transition to a trivial insulator without gap-closing when the inversion symmetry is broken. The gap-closing critical states are found to be magnetic semimetals with a single Dirac node which, unlike the classic Haldane model, can move along the high-symmetry lines in the Brillouin zone. MHM offers a rich tapestry of HOTI and other topological and non-topological phases.