Electronic properties of the dimerized one-dimensional Hubbard model using lattice density-functional theory
Abstract
The dimerized one-dimensional Hubbard model is studied in the framework of lattice density-functional theory (LDFT). The single-particle density matrix gammaij with respect to the lattice sites is considered as basic variable. The corresponding interaction-energy functional W[gammaij] is defined by Levy's constrained search. Exact numerical results are obtained for W(gamma12,gamma23) where gamma12 = gammai,i+1 for i odd and gamma23 = gammai,i+1 for i even are the nearest-neighbor density-matrix elements along the chain. The domain of representability of gammaij and the functional dependence of W(gamma12,gamma23) are analyzed. A simple, explicit approximation to W(gamma12,gamma23) is proposed, which is derived from scaling properties of W, exact dimer results, and known limits. Using this approximation, LDFT is applied to determine ground-state properties and charge-excitation gaps of finite and infinite dimerized chains as a function of the Coulomb-repulsion strength U/t and of the alternation delta t of the hopping integrals tij (tij = t + or - delta t). The accuracy of the method is demonstrated by comparison with available exact solutions and accurate numerical calculations. Goals and limitations of the present approach are discussed particularly concerning its ability to describe the crossover from weak to strong electron correlations.
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