We address a long-standing debate regarding the finite-size scaling (FSS) of the Ising model in high dimensions, by introducing a random-length random walk model, which we then study rigorously. We prove that this model exhibits the same universal FSS behavior previously conjectured for the self-avoiding walk and Ising model on finite boxes in high-dimensional lattices. Our results show that the mean walk length of the random walk model controls the scaling behavior of the corresponding Green's function. We numerically demonstrate the universality of our rigorous findings by extensive Monte Carlo simulations of the Ising model and self-avoiding walk on five-dimensional hypercubic lattices with free and periodic boundaries.</p
The authors study self-avoiding walks (SAW) on randomly diluted (quenched) lattices with direct conf...
We have investigated the random walk problem in a finite system and studied the crossover induced in...
Abstract. We study the support (i.e. the set of visited sites) of a t-step random walk on a two-dime...
We address a long-standing debate regarding the finite-size scaling (FSS) of the Ising model in high...
We give an intuitive geometric explanation for the apparent breakdown of standard finite-size scalin...
We present a new finite-size scaling method for the random walks (RW) superseding a previously widel...
We study unwrapped two-point functions for the Ising model, the self-avoiding walk and a random-leng...
We investigate the scaling limit of the range (the set of visited vertices) for a general class of c...
International audienceWe study the critical behavior of the Ising model in the case of quenched diso...
We address the problem of the definition of the finite-volume correlation length. First, we study th...
The nearest neighbor contacts between the two halves of an N-site lattice self-avoiding walk offe...
There has been a long running debate on the finite size scaling for the Ising model with free bounda...
We investigate dynamical processes on random and regular fractals. The (static) problem of percolati...
We study the nearest-neighbour Ising model with a class of random boundary conditions, chosen from a...
We consider self-avoiding walk, percolation and the Ising model with long and finite range. By means...
The authors study self-avoiding walks (SAW) on randomly diluted (quenched) lattices with direct conf...
We have investigated the random walk problem in a finite system and studied the crossover induced in...
Abstract. We study the support (i.e. the set of visited sites) of a t-step random walk on a two-dime...
We address a long-standing debate regarding the finite-size scaling (FSS) of the Ising model in high...
We give an intuitive geometric explanation for the apparent breakdown of standard finite-size scalin...
We present a new finite-size scaling method for the random walks (RW) superseding a previously widel...
We study unwrapped two-point functions for the Ising model, the self-avoiding walk and a random-leng...
We investigate the scaling limit of the range (the set of visited vertices) for a general class of c...
International audienceWe study the critical behavior of the Ising model in the case of quenched diso...
We address the problem of the definition of the finite-volume correlation length. First, we study th...
The nearest neighbor contacts between the two halves of an N-site lattice self-avoiding walk offe...
There has been a long running debate on the finite size scaling for the Ising model with free bounda...
We investigate dynamical processes on random and regular fractals. The (static) problem of percolati...
We study the nearest-neighbour Ising model with a class of random boundary conditions, chosen from a...
We consider self-avoiding walk, percolation and the Ising model with long and finite range. By means...
The authors study self-avoiding walks (SAW) on randomly diluted (quenched) lattices with direct conf...
We have investigated the random walk problem in a finite system and studied the crossover induced in...
Abstract. We study the support (i.e. the set of visited sites) of a t-step random walk on a two-dime...