Folding Transition of the Triangular Lattice
arXiv:cond-mat/9406041 · doi:10.1103/PhysRevE.50.4418
Abstract
We study the problem of folding of the regular triangular lattice in the presence of bending rigidity K and magnetic field h (conjugate to the local normal vectors to the triangles). A numerical study of the transfer matrix of the problem shows the existence of three first order transition lines in the (K,h) plane separating three phases: a folded phase, a phase frozen in the completely flat configuration (with all normal vectors pointing up) and its mirror image (all normal vectors pointing down). At zero magnetic field, a first order folding transition is found at a positive value K_c=0.11(1) of the bending rigidity, corresponding to a triple point in the phase diagram.
20 pages, uuencoded, compressed tar file using harvmac(b) and epsf, 11 figures included, Saclay preprint T94/073