Electric circuit simulations of nth-Chern insulators in 2n-dimensional space and their non-Hermitian generalizations for arbitral n

Abstract

We show that topological phases of the Dirac system in arbitral even dimensional space are simulated by LC electric circuits with operational amplifiers. The lattice Hamiltonian for the hypercubic lattice in 2n dimensional space is characterized by the n-th Chern number. The boundary state is described by the Weyl theory in 2n-1 dimensional space. They are well observed by measuring the admittance spectrum. They are different from the disentangled n-th Chern insulators previously reported, where the n-th Chern number is a product of the first Chern numbers. The results are extended to non-Hermitian systems with complex Dirac masses. The non-Hermitian n-th Chern number remains to be quantized for the complex Dirac mass.