The Crumpling Transition Revisited
نویسنده
چکیده
The “crumpling” transition, between rigid and crumpled surfaces, has been object of much discussion over the past years. The common lore is that such transition should be of second order. However, some lattice versions of the rigidity term on fixed connectivity surfaces seem to suggest that the transition is of higher order instead. While some models exhibit what appear to be lattice artifacts, others are really indistiguishable from models where second order transitions have been reported and yet appear to have third order transitions.
منابع مشابه
Crumpling transition in tethered surfaces
We study the crumpling transition in tethered surfaces subject to different interactions, and provide numerical simulations for each case. Phantom tethered surfaces undergo a crumpling transition at finite bending rigidity κc. For κ < κc, the surface exhibits a crumpled phase, and the radius of gyration is Rg ∼ √ lnL where L describes the length of the surface; for κ > κc, the surface exhibits ...
متن کاملBending-rigidity-driven transition and crumpling-point scaling of lattice vesicles.
The crumpling transition of three-dimensional ~3D! lattice vesicles subject to a bending fugacity r5exp(2k/kBT) is investigated by Monte Carlo methods in a grand canonical framework. By also exploiting conjectures suggested by previous rigorous results, a critical regime with scaling behavior in the universality class of branched polymers is found to exist for r.rc . For r,rc the vesicles under...
متن کاملThe Crumpling Transition of Dynamically Triangulated Random Surfaces
We present the crumpling transition in three-dimensional Euclidian space of dynamically triangulated random surfaces with edge extrinsic curvature and fixed topology of a sphere as well as simulations of a dynamically triangulated torus. We used longer runs than previous simulations and give new and more accurate estimates of critical exponents. Our data indicate a cusp singularity in the speci...
متن کاملPhase transitions of a tethered membrane model with intrinsic curvature on spherical surfaces with point boundaries
We found that the order for the crumpling transition of an intrinsic curvature model changes depending on the distance between two boundary vertices fixed on the surface of spherical topology. The model is a curvature one governed by an intrinsic curvature energy, which is defined on triangulated surfaces. It was already reported that the model undergoes a first-order crumpling transition witho...
متن کاملUniversal behavior of crystalline membranes: Crumpling transition and Poisson ratio of the flat phase.
We revisit the universal behavior of crystalline membranes at and below the crumpling transition, which pertains to the mechanical properties of important soft and hard matter materials, such as the cytoskeleton of red blood cells or graphene. Specifically, we perform large-scale Monte Carlo simulations of a triangulated two-dimensional phantom network which is freely fluctuating in three-dimen...
متن کاملذخیره در منابع من
با ذخیره ی این منبع در منابع من، دسترسی به آن را برای استفاده های بعدی آسان تر کنید
عنوان ژورنال:
دوره شماره
صفحات -
تاریخ انتشار 1992