Ginzburg-Landau theory of the zig-zag transition in quasi-one-dimensional classical Wigner crystals

Abstract

We present a mean-field description of the zig-zag phase transition of a quasi-one-dimensional system of strongly interacting particles, with interaction potential r-ne-r/λ, that are confined by a power-law potential (yα). The parameters of the resulting one-dimensional Ginzburg-Landau theory are determined analytically for different values of α and n. Close to the transition point for the zig-zag phase transition, the scaling behavior of the order parameter is determined. For α=2 the zig-zag transition from a single to a double chain is of second order, while for α>2 the one chain configuration is always unstable and for α<2 the one chain ordered state becomes unstable at a certain critical density resulting in jumps of single particles out of the chain.