A nested sequence of projectors (2): Multiparameter multistate statistical models, Hamiltonians, S-matrices
Abstract
Our starting point is a class of braid matrices, presented in a previous paper, constructed on a basis of a nested sequence of projectors. Statistical models associated to such matrices for odd are studied here. Presence of free parameters is the crucial feature of our models, setting them apart from other well-known ones. There are possible states at each site. The trace of the transfer matrix is shown to depend on parameters. For order , eigenvalues consitute the trace and the remaining eigenvalues involving the full range of parameters come in zero-sum multiplets formed by the -th roots of unity, or lower dimensional multiplets corresponding to factors of the order when is not a prime number. The modulus of any eigenvalue is of the form , where is a linear combination of the free parameters, being the spectral parameter. For a prime number an amusing relation of the number of multiplets with a theorem of Fermat is pointed out. Chain Hamiltonians and potentials corresponding to factorizable -matrices are constructed starting from our braid matrices. Perspectives are discussed.
Cite
@article{arxiv.math/0601584,
title = {A nested sequence of projectors (2): Multiparameter multistate statistical models, Hamiltonians, S-matrices},
author = {B. Abdesselam and A. Chakrabarti},
journal= {arXiv preprint arXiv:math/0601584},
year = {2009}
}
Comments
32 pages, no figure, few mistakes are corrected