Violating conformal invariance: Two-dimensional clusters grafted to wedges, cones, and branch points of Riemann surfaces
Abstract
We present simulations of 2-d site animals on square and triangular lattices in non-trivial geomeLattice animals are one of the few critical models in statistical mechanics violating conformal invariance. We present here simulations of 2-d site animals on square and triangular lattices in non-trivial geometries. The simulations are done with the newly developed PERM algorithm which gives very precise estimates of the partition sum, yielding precise values for the entropic exponent θ (ZN μN N-θ). In particular, we studied animals grafted to the tips of wedges with a wide range of angles α, to the tips of cones (wedges with the sides glued together), and to branching points of Riemann surfaces. The latter can either have k sheets and no boundary, generalizing in this way cones to angles α > 360 degrees, or can have boundaries, generalizing wedges. We find conformal invariance behavior, θ 1/α, only for small angles (α 2π), while θ ≈ const -α/2π for α 2π. These scalings hold both for wedges and cones. A heuristic (non-conformal) argument for the behavior at large α is given, and comparison is made with critical percolation.
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