Charge and Spin Structures of a dx2 - y2 Superconductor in the Proximity of an Antiferromagnetic Mott Insulator
Abstract
To the Hubbard model on a square lattice we add an interaction, W, which depends upon the square of a near-neighbor hopping. We use zero temperature quantum Monte Carlo simulations on lattice sizes up to 16 × 16, to show that at half-filling and constant value of the Hubbard repulsion, the interaction W triggers a quantum transition between an antiferromagnetic Mott insulator and a dx2 -y2 superconductor. With a combination of finite temperature quantum Monte Carlo simulations and the Maximum Entropy method, we study spin and charge degrees of freedom in the superconducting state. We give numerical evidence for the occurrence of a finite temperature Kosterlitz-Thouless transition to the dx2 -y2 superconducting state. Above and below the Kosterlitz-Thouless transition temperature, TKT, we compute the one-electron density of states, N(ω), the spin relaxation rate 1/T1, as well as the imaginary and real part of the spin susceptibility (q,ω). The spin dynamics are characterized by the vanishing of 1/T1 and divergence of Re (q = (π,π), ω = 0) in the low temperature limit. As TKT is approached N(ω) develops a pseudo-gap feature and below TKT Im (q = (π,π), ω) shows a peak at finite frequency.
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