2006

B. Dietz 1, A. Heine 1, A. Richter 1, O. Bohigas 2, P. Leboeuf 2 Physical Review E: Statistical, Nonlinear, and Soft Matter Physics 73 (2006) 035201 We present experimental results on the eigenfrequency statistics of a superconducting, chaotic microwave billiard containing a rotatable obstacle. Deviations of the spectral fluctuations from predictions based on Gaussian orthogonal ensembles of random matrices are found. They are explained […]

Satya N. Majumdar 1, Chandan Dasgupta 2 Physical Review E: Statistical, Nonlinear, and Soft Matter Physics 73 (2006) 011602 We report numerical and analytic results for the spatial survival probability for fluctuating one-dimensional interfaces with Edwards-Wilkinson or Kardar-Parisi-Zhang dynamics in the steady state. Our numerical results are obtained from analysis of steady-state profiles generated by integrating a spatially discretized

Alejandro B. Kolton 1, Alberto Rosso 2, Ezequiel V. Albano 3, Thierry Giamarchi 1 Physical Review B 74 (2006) 140201 We study numerically the relaxation of a driven elastic string in a two dimensional pinning landscape. The relaxation of the string, initially flat, is governed by a growing length $L(t)$ separating the short steady-state equilibrated lengthscales, from the large lengthscales that keep memory

Richard Oberdorf 1, Allison Ferguson 1, Jesper L. Jacobsen 2, 3, Jane’ Kondev 1 Physical Review E: Statistical, Nonlinear, and Soft Matter Physics 74 (2006) 051801 Compact polymers are self-avoiding random walks which visit every site on a lattice. This polymer model is used widely for studying statistical problems inspired by protein folding. One difficulty with using compact polymers to perform numerical calculations is

Marc Mezard 1, Andrea Montanari 2 Journal of Statistical Physics 124 (2006) 1317-1350 Consider an information source generating a symbol at the root of a tree network whose links correspond to noisy communication channels, and broadcasting it through the network. We study the problem of reconstructing the transmitted symbol from the information received at the leaves. In the large

O. Bohigas 1, M. P. Pato 1, 2 Physical Review E: Statistical, Nonlinear, and Soft Matter Physics 74 (2006) 036212 By randomly removing a fraction of levels from a given spectrum a model is constructed that describes a crossover from this spectrum to a Poisson spectrum. The formalism is applied to the transitions towards Poisson from random matrix theory (RMT)

S. Sumedha 1, 2, Deepak Dhar 1 Journal of Statistical Physics 125 (2006) 55-76 We study rooted self avoiding polygons and self avoiding walks on deterministic fractal lattices of finite ramification index. Different sites on such lattices are not equivalent, and the number of rooted open walks W_n(S), and rooted self-avoiding polygons P_n(S) of n steps depend on the root

Paul Zinn-Justin 1 Electronic Journal of Combinatories 13 (2006) R110 We prove the Razumov–Stroganov conjecture relating ground state of the O(1) loop model and counting of Fully Packed Loops in the case of certain types of link patterns. The main focus is on link patterns with three series of nested arches, for which we use as key

Thorsten Emig 1, 2, Thomas Nattermann 1 Physical Review Letters 97 (2006) 177002 It is shown that the Bragg glass phase can become unstable with respect to planar defects. A single defect plane that is oriented parallel to the magnetic field as well as to one of the main axis of the Abrikosov flux line lattice is always relevant, whereas

Thorsten Emig 1, 2 Journal of Physics A 39 (2006) 6309 A new approach to the Helmholtz spectrum for arbitrarily shaped boundaries and a rather general class of boundary conditions is introduced. We derive the boundary induced change of the density of states in terms of the free Green’s function from which we obtain both perturbative and non-perturbative