Christian Korff
Published 2004-08-12, updated 2004-08-17Version 2
The spectra of previously constructed auxiliary matrices for the six-vertex model at roots of unity are investigated for spin-chains of even and odd length. The two cases show remarkable differences. In particular, it is shown that for even roots of unity and an odd number of sites the eigenvalues contain two linear independent solutions to Baxter's TQ-equation corresponding to the Bethe ansatz equations above and below the equator. In contrast, one finds for even spin-chains only one linear independent solution and complete strings. The other main result is the proof of a previous conjecture on the degeneracies of the six-vertex model at roots of unity. The proof rests on the derivation of a functional equation for the auxiliary matrices which is closely related to a functional equation for the eight-vertex model conjectured by Fabricius and McCoy.
Comments: 22 pages; 2nd version: one paragraph added in the conclusion and some typos corrected
Journal: J.Phys. A38 (2005) 47-66
Auxiliary matrices for the six-vertex model at roots of unity II
Auxiliary matrices for the six-vertex model and the algebraic Bethe ansatz
Transmission amplitudes from Bethe ansatz equations
