A comparative study of the phase diagrams of spin-1 2 and spin-1 antiferromagnetic chains with dimerization and frustration
Abstract
We use the density matrix renormalization group method to study the ground state `phase' diagram and some low-energy properties of isotropic antiferromagnetic spin-1 2 and spin-1 chains with a next-nearest neighbor exchange J2 ~ and an alternation δ of the nearest neighbor exchanges. In the spin-1 2 chain, the system is gapless for δ=0 and J2 < J2c =0.241, and is gapped everywhere else in the J2 - δ plane. At J2c, for small δ, the gap increases as δα, where α = 0.667 0.001. 2J2 + δ = 1 is a disorder line. To the left of this line, the structure factor S(q) peaks at qmax = π (Neel `phase'), while to the right, qmax decreases from π to π/2 (spiral `phase') as J2 increases. There is also a ` phase' for large values of both J2 and δ. In the spin-1 case, we find a line running from a gapless point at (J2 , δ) = (0,0.25 0.01) upto a `gapless' point at (0.73 0.005,0) such that the open chain ground state is four-fold degenerate below the line and is unique above it. There is a disorder line in this case also and it has the same equation as in the spin-1 2 case, but the line ends at about δ =0.136. Similar to the spin-1 2 case, to the left of this line, the peak in the structure factor is at π (Neel `phase'), while to the right of the line, it is at less than π (spiral `phase'). For δ =1, the system corresponds to a spin ladder and the system is gapped for all values of the interchain coupling for both spin-1 2 and spin-1 ladders.
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