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We study the many-body ground states of three-component quantum particles in two prototypical topological lattice models under strong intercomponent and intracomponent repulsions. At band filling =3/4 for hardcore bosons, we demonstrate the emergence of three-component fractional quantum Hall (FQH) effect characterized by the K matrix, through exact diagonalization study of four-fold quasidegenerate ground states with a robust spectrum gap and the combined density-matrix renormalization group calculation of fractional drag charge pumping. Further we formulate the topological characterization of FQH states of three-component Bose-Fermi mixtures at various fillings by the K matrix. At last we discuss the possible generalization of our approach to identify non-Abelian three-component spin-singlet FQH states.
Tian-Sheng Zeng (Thu,) studied this question.
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