English

$1/d$ Expansion for $k$-Core Percolation

Disordered Systems and Neural Networks 2009-11-11 v3 Soft Condensed Matter

Abstract

The physics of kk-core percolation pertains to those systems whose constituents require a minimum number of kk connections to each other in order to participate in any clustering phenomenon. Examples of such a phenomenon range from orientational ordering in solid ortho-para H2{\rm H}_2 mixtures to the onset of rigidity in bar-joint networks to dynamical arrest in glass-forming liquids. Unlike ordinary (k=1k=1) and biconnected (k=2k=2) percolation, the mean field k3k\ge3-core percolation transition is both continuous and discontinuous, i.e. there is a jump in the order parameter accompanied with a diverging length scale. To determine whether or not this hybrid transition survives in finite dimensions, we present a 1/d1/d expansion for kk-core percolation on the dd-dimensional hypercubic lattice. We show that to order 1/d31/d^3 the singularity in the order parameter and in the susceptibility occur at the same value of the occupation probability. This result suggests that the unusual hybrid nature of the mean field kk-core transition survives in high dimensions.

Keywords

Cite

@article{arxiv.cond-mat/0505329,
  title  = {$1/d$ Expansion for $k$-Core Percolation},
  author = {A. B. Harris and J. M. Schwarz},
  journal= {arXiv preprint arXiv:cond-mat/0505329},
  year   = {2009}
}

Comments

47 pages, 26 figures, revtex4