Artículos de revistas
NOISE and ULTRAVIOLET DIVERGENCES IN SIMULATIONS of GINZBURG-LANDAU-LANGEVIN TYPE of EQUATIONS
Fecha
2012-08-01Registro en:
International Journal of Modern Physics C. Singapore: World Scientific Publ Co Pte Ltd, v. 23, n. 8, p. 9, 2012.
0129-1831
10.1142/S0129183112400165
WOS:000307849200017
5704289678296630
Autor
Universidade Estadual Paulista (Unesp)
Universidade Federal de São João del-Rei (UFSJ)
Universidade Federal de São Paulo (UNIFESP)
Institución
Resumen
The time evolution of an order parameter towards equilibrium can be described by nonlinear Ginzburg-Landau (GL) type of equations, also known as time-dependent nonlinear Schrodinger equations. Environmental effects of random nature are usually taken into account by noise sources, turning the GL equations into stochastic equations. Noise sources give rise to lattice-spacing dependence of the solutions of the stochastic equations. We present a systematic method to renormalize the equations on a spatial lattice to obtain lattice-spacing independent solutions. We illustrate the method in approximation schemes designed to treat nonlinear and nonlocal GL equations that appear in real time thermal field theory and stochastic quantization.