Extended T-systems, Q matrices and T-Q relations for s(2) models at roots of unity

Abstract

The mutually commuting 1× n fused single and double-row transfer matrices of the critical six-vertex model are considered at roots of unity q=eiλ with crossing parameter λ=(p'-p)πp' a rational fraction of π. The 1× n transfer matrices of the dense loop model analogs, namely the logarithmic minimal models LM(p,p'), are similarly considered. For these s(2) models, we find explicit closure relations for the T-system functional equations and obtain extended sets of bilinear T-system identities. We also define extended Q matrices as linear combinations of the fused transfer matrices and obtain extended matrix T-Q relations. These results hold for diagonal twisted boundary conditions on the cylinder as well as Uq(s(2)) invariant/Kac vacuum and off-diagonal/Robin vacuum boundary conditions on the strip. Using our extended T-system and extended T-Q relations for eigenvalues, we deduce the usual scalar Baxter T-Q relation and the Bazhanov-Mangazeev decomposition of the fused transfer matrices Tn(u+λ) and Dn(u+λ), at fusion level n=p'-1, in terms of the product Q+(u)Q-(u) or Q(u)2. It follows that the zeros of Tp'-1(u+λ) and Dp'-1(u+λ) are comprised of the Bethe roots and complete p' strings. We also clarify the formal observations of Pronko and Yang-Nepomechie-Zhang and establish, under favourable conditions, the existence of an infinite fusion limit n∞ in the auxiliary space of the fused transfer matrices. Despite this connection, the infinite-dimensional oscillator representations are not needed at roots of unity due to finite closure of the functional equations.