【 摘 要 】

In the present work, we investigate the effects of long-range interactions on the phase transitions of a two-dimensional Heisenberg model with single-ion anisotropy at zero and finite temperatures. The Hamiltonian is given by H = Sigma(i not equal j)J(ij)((SiSjx)-S-x+(SiSjv)-S-v+lambda(SiSjz)-S-z) + D Sigma(i)(S-i(z))(2), where J(ij) = -J vertical bar r(j) - r(i)vertical bar(-p) (p >= 3) is a long-range ferromagnetic interaction (J > 0), 0 < lambda < 1 is an anisotropic constant and 0 is the single-ion anisotropic constant. It is well-known that the single-ion anisotropy D creates a competition between an ordered state (favored by the exchange interaction) and a disordered state, even at zero temperature. For small values of D, the system has a spontaneous magnetization in m(z) not equal 0, while in the large-D phase m(z) = 0 because a state with < S-z > not equal 0 is energetically unfavorable. Therefore a phase transition takes a place in some critical value D-c due to quantum fluctuations. For systems with short-range interaction D-c approximate to 6 J (depending of lambda constant) but in our model we have found larger values of 0 due to the higher cost to flip a spin. Since low-dimensional magnetic systems with long range interaction can be ordered at finite temperature, we also have analyzed the thermal phase transitions (similar to the rma transition). The model has been studied by using a Schwinger boson formalism as well as the self-consistent harmonic approximation (SCHA) and both methods provide according results. (C) 2014 Elsevier B.V. All rights reserved

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