In this paper dynamical critical phenomena of the Gaussian model with long-range interactions decaying as 1/rd+δ (δ> 0) on d-dimensional hypercubic lattices (d = 1, 2, and 3) are studied. First, the critical points...In this paper dynamical critical phenomena of the Gaussian model with long-range interactions decaying as 1/rd+δ (δ> 0) on d-dimensional hypercubic lattices (d = 1, 2, and 3) are studied. First, the critical points are exactly calculated, and it is found that the critical points depend on the value of δ and the range of interactions. Then the critical dynamics is considered. We calculate the time evolutions of the local magnetizations and the spin-spin correlation functions, and further the dynamic critical exponents are obtained. For one-, two- and three-dimensional lattices, it is found that the dynamic critical exponents are all z = 2 if δ> 2, which agrees with the result when only considering nearest neighboring interactions, and that they are all δ if 0 <δ< 2. It shows that the dynamic critical exponents are independent of the spatial dimensionality but depend on the value of δ.展开更多
文摘In this paper dynamical critical phenomena of the Gaussian model with long-range interactions decaying as 1/rd+δ (δ> 0) on d-dimensional hypercubic lattices (d = 1, 2, and 3) are studied. First, the critical points are exactly calculated, and it is found that the critical points depend on the value of δ and the range of interactions. Then the critical dynamics is considered. We calculate the time evolutions of the local magnetizations and the spin-spin correlation functions, and further the dynamic critical exponents are obtained. For one-, two- and three-dimensional lattices, it is found that the dynamic critical exponents are all z = 2 if δ> 2, which agrees with the result when only considering nearest neighboring interactions, and that they are all δ if 0 <δ< 2. It shows that the dynamic critical exponents are independent of the spatial dimensionality but depend on the value of δ.
