论文信息 - Stripe ansätze from exactly solved models

Stripe ansätze from exactly solved models

Using the Boltzmann weights of classical statistical-mechanics vertex models we define a new class of tensor product Ansaetze for two-dimensional quantum-lattice systems, characterized by a strong anisotropy, which gives rise to stripelike structures. In the case of the six-vertex model we compute exactly, in the thermodynamic limit, the norm of the Ansatz, and other observables. Employing this Ansatz we study the phase diagram of a Hamiltonian given by the sum of XXZ Hamiltonians along the legs coupled by an Ising term. Finally, we suggest a connection between the six- and eight-vertex anisotropic tensor-product Ansaetze, and their associated Hamiltonians, with the smectic-stripe phases recently discussed in the literature.

M. Martin-Delgado | G. Sierra | M. Roncaglia | Germán Sierra

[1] Germán Sierra,et al. Renormalization Group study of the Sliding Luttinger liquids , 2003 .

[2] M. Jacob,et al. About Les Houches , 2002 .

[3] T. Nishino,et al. Vertical density matrix algorithm: a higher-dimensional numerical renormalization scheme based on the tensor product state ansatz. , 2001, Physical review. E, Statistical, nonlinear, and soft matter physics.

[4] K. Hallberg. Density Matrix Renormalization , 1999, cond-mat/9910082.

[5] J. Zittartz,et al. Optimum ground states of generalized Hubbard models with next-nearest neighbour interaction , 1999, cond-mat/9905157.

[6] J. Zittartz,et al. Quantum spin-$${3 \over 2}$$ models on the Cayley tree - optimum ground state approach , 1998, cond-mat/9810147.

[7] A. Ushveridze. Quasi-Exactly Solvable Models in Quantum Mechanics , 1994 .

[8] R. Baxter. Exactly solved models in statistical mechanics , 1982 .