Ripples in hexagonal lattices of atoms coupled to Glauber spins

TL;DR

This paper analyzes a coupled atom-spin system on lattices, revealing complex phase behaviors including ripples, magnetic order, and disordered phases, with analytical and phase diagram insights.

Contribution

It provides an analytical calculation of equilibrium states and phase diagrams for atom-spin coupled lattices, including complex behaviors on hexagonal two-dimensional lattices.

Findings

First and second order phase transitions in 1D lattice.

Multiple ordered and disordered phases on 2D hexagonal lattice.

Identification of ripple and magnetic order correlations.

Abstract

A system of atoms connected by harmonic springs to their nearest neighbors on a lattice is coupled to Ising spins that are in contact with a thermal bath and evolve under Glauber dynamics. Assuming a nearest-neighbor antiferromagnetic interaction between spins, we calculate analytically the equilibrium state. On a one-dimensional attice, the system exhibits first and second order phase transitions. The order parameters are the total magnetization and the number of spin pairs in an antiferromagnetic configuration. On a hexagonal two dimensional lattice, spins interact with their nearest-neighbors and next-nearest-neighbors. Together with the coupling to atoms, these interactions produce a complex behavior that is displayed on a phase diagram. There are: ordered phases associated to ripples with atomic wavelength and antiferromagnetic order, ordered phases associated to ripples with nanometer wavelengths and ferromagnetic order, disordered glassy phases, and other phases presenting stripes formed by different domains. These static phases are discussed in relation to existing experiments and results for other models found in the literature.