Localization length of a soliton from a non-magnetic impurity in a general double-spin-chain model
Abstract
A localization length of a free-spin soliton from a non-magnetic impurity is deduced in a general double-spin-chain model (J0-J1-J2-J3 model). We have solved a variational problem which employs the nearest-neighbor singlet-dimer basis. The wave function of a soliton is expressed by the Airy function, and the localization length () is found to obey a power law of the dimerization (J2-J3) with an exponent -1/3; (J2-J3)-1/3. This explains why NaV2O5 does not show the antiferromagnetic order, while CuGeO3 does by impurity doping. When the gap exists by the bond-dimerization, a soliton is localized and no order is expected. Contrary, there is a possibility of the order when the gap is mainly due to frustration.
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