English

Defect-unbinding transitions and inherent structures in two dimensions

Statistical Mechanics 2009-10-31 v1

Abstract

We present a large-scale (36000-particle) computational study of the "inherent structures" (IS) associated with equilibrium, two-dimensional, one-component Lennard-Jones systems. Our results provide strong support both for the inherent-structures theory of classical fluids, and for the KTHNY theory of two-stage melting in two dimensions. This support comes from the observation of three qualitatively distinct "phases" of inherent structures: a crystal, a "hexatic glass", and a "liquid glass". We also directly observe, in the IS, analogs of the two defect-unbinding transitions (respectively, of dislocations, and disclinations) believed to mediate the two equilibrium phase transitions. Each transition shows up in the inherent structures---although the free disclinations in the "liquid glass" are embedded in a percolating network of grain boundaries. The bond-orientational correlation functions of the inherent structures show the same progressive loss of order as do the three equilibrium phases: long-range to quasi-long-range to short-range.

Keywords

Cite

@article{arxiv.cond-mat/9809179,
  title  = {Defect-unbinding transitions and inherent structures in two dimensions},
  author = {F. L. Somer and G. S. Canright and Ted Kaplan},
  journal= {arXiv preprint arXiv:cond-mat/9809179},
  year   = {2009}
}

Comments

RevTeX, 8 pages, 15 figures