Critical Behavior of Branched Polymers and the Lee-Yang Edge Singularity
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Publication:2732608
DOI10.1103/PhysRevLett.46.871zbMath0969.82030OpenAlexW1994402242MaRDI QIDQ2732608
Nicolas Sourlas, Giorgio Parisi
Publication date: 6 September 2001
Published in: Physical Review Letters (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1103/physrevlett.46.871
Related Items (21)
Critical two-point functions and the lace expansion for spread-out high-dimensional percolation and related models. ⋮ On the number of hexagonal polyominoes ⋮ On the upper critical dimension of lattice trees and lattice animals ⋮ Random field \(\phi^3\) model and Parisi-Sourlas supersymmetry ⋮ Random-field Ising and \(O(N)\) models: theoretical description through the functional renormalization group ⋮ Probing Yang–Lee edge singularity by central spin decoherence ⋮ A review of Monte Carlo simulations of polymers with PERM ⋮ Low-concentration series in general dimension. ⋮ Series expansion of the percolation threshold on hypercubic lattices ⋮ Partition and generating function zeros in adsorbing self-avoiding walks ⋮ Supersymmetric field theories and stochastic differential equations ⋮ Transfer matrices and partition-function zeros for antiferromagnetic Potts models. IV. Chromatic polynomial with cyclic boundary conditions ⋮ NoBLE for lattice trees and lattice animals ⋮ History and Introduction to Polygon Models and Polyominoes ⋮ Polygons and the Lace Expansion ⋮ Monte Carlo study of the \(\Theta\)-point for collapsing trees ⋮ Fisher renormalization for logarithmic corrections ⋮ Random field Ising model and Parisi-Sourlas supersymmetry. I: Supersymmetric CFT ⋮ Spanning forests and the \(q\)-state Potts model in the limit \(q \to 0\) ⋮ A rigorous bound on the critical exponent for the number of lattice trees, animals, and polygons. ⋮ Partition function zeros of the \(Q\)-state Potts model on the simple-cubic lattice
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