Fractionally quantized Berry phases of magnetization plateaux in spin-1/2 Heisenberg multimer chains

Abstract

We study the fractionally quantized ZN Berry phase, γN=0, 2π N, 4π N,…, 2(N-1)π N, to characterize local N-mer spin structures at magnetization plateaux in spin-1/2 Heisenberg multimer (N-mer) models, i.e., highly frustrated N-leg ladder models, which are generalizations of an orthogonal dimer chain and have exact ground states in the strong multimer coupling region. We demonstrate that all N types of Berry phases, which characterize magnetization-plateau phases, appear in a magnetic phase diagram when N=2 and 4. We show that magnetization plateau with magnetization m and D-fold degenerated states has γN=π ( m-1) D, except for the Haldane phase with γN=0. In addition, we find that a complementary ZN Berry phase becomes non-zero in the S=N/2 Haldane phase for N=2 and 4. Because the exact quantization of the ZN Berry phases is protected by the translational (or rotational) symmetry along the rung direction, the ZN Berry phase has the potential to be applied for a wide class of magnetization plateaux in coupled multimer systems.