Thermodynamics of Integrable Chains with Alternating Spins
Abstract
We consider a two-parameter ( c, c) family of quantum integrable Hamiltonians for a chain of alternating spins of spin s=1/2 and s=1. We determine the thermodynamics for low-temperature T and small external magnetic field H, with T << H. In the antiferromagnetic ( c > 0, c > 0) case, the model has two gapless excitations. In particular, for c = c, the model is conformally invariant and has central charge cvir = 2. When one of these parameters is zero, the Bethe Ansatz equations admit an infinite number of solutions with lowest energy.
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