Magnetization plateaus in spin chains: ``Haldane gap'' for half-integer spins
Abstract
We discuss zero-temperature quantum spin chains in a uniform magnetic field, with axial symmetry. For integer or half-integer spin, S, the magnetization curve can have plateaus and we argue that the magnetization per site m is topologically quantized as q (S - m)= integer at the plateaus, where q is the period of the groundstate. We also discuss conditions for the presence of the plateau at those quantized values. For S=3/2 and m=1/2, we study several models and find two distinct types of massive phases at the plateau. One of them is argued to be a ``Haldane gap phase'' for half-integer S.
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