The scaling behavior of self-avoiding walks (SAWs) on the backbone of percolation clusters in two, three and four dimensions is studied by Monte Carlo simulations. We apply the pruned-enriched Rosenbluth chain growth method (PERM). Our numerical results bring about the estimates of critical exponents, governing the scaling laws of disorder averages of the end-to-end distance of SAW configurations. The effects of finite-size scaling are discussed as well
Large contour lines in a random landscape constitute a continuum percolation problem. We consider di...
The primary focus of this work is to obtain precise values of critical exponents associated with ran...
In this paper, we study the abundance of self-avoiding paths of a given length on a supercritical pe...
The authors study self-avoiding walks (SAW) on randomly diluted (quenched) lattices with direct conf...
AbstractThe scaling behavior of linear polymers in disordered media, modelled by self-avoiding walks...
This work presents a numerical investigation of self-avoiding walks (SAWs) on percolation clusters, ...
Enumerating all the $N$-stepped SAW configurations on the infinite percolation cluster of Monte Carl...
We numerically investigate random walks (RWs) and self-avoiding random walks (SAWs) on critical perc...
The average connectivity constant mu of self-avoiding walks (SAWs) is obtained from exact enumeratio...
We investigate dynamical processes on random and regular fractals. The (static) problem of percolati...
The scaling properties of linear polymers on deterministic fractal structures, modeled by self-avoid...
We numerically investigate random walks (RWs) and self-avoiding random walks (SAWs) on critical perc...
AbstractWe study the scaling behavior of self-avoiding walks on critically dilute lattices. To this ...
Self-avoiding-walk (SAW) statistics on randomly dilute lattices is reviewed. The phase diagrams, giv...
A brief review of our recent studies aiming at a better understanding of the scaling behaviour of po...
Large contour lines in a random landscape constitute a continuum percolation problem. We consider di...
The primary focus of this work is to obtain precise values of critical exponents associated with ran...
In this paper, we study the abundance of self-avoiding paths of a given length on a supercritical pe...
The authors study self-avoiding walks (SAW) on randomly diluted (quenched) lattices with direct conf...
AbstractThe scaling behavior of linear polymers in disordered media, modelled by self-avoiding walks...
This work presents a numerical investigation of self-avoiding walks (SAWs) on percolation clusters, ...
Enumerating all the $N$-stepped SAW configurations on the infinite percolation cluster of Monte Carl...
We numerically investigate random walks (RWs) and self-avoiding random walks (SAWs) on critical perc...
The average connectivity constant mu of self-avoiding walks (SAWs) is obtained from exact enumeratio...
We investigate dynamical processes on random and regular fractals. The (static) problem of percolati...
The scaling properties of linear polymers on deterministic fractal structures, modeled by self-avoid...
We numerically investigate random walks (RWs) and self-avoiding random walks (SAWs) on critical perc...
AbstractWe study the scaling behavior of self-avoiding walks on critically dilute lattices. To this ...
Self-avoiding-walk (SAW) statistics on randomly dilute lattices is reviewed. The phase diagrams, giv...
A brief review of our recent studies aiming at a better understanding of the scaling behaviour of po...
Large contour lines in a random landscape constitute a continuum percolation problem. We consider di...
The primary focus of this work is to obtain precise values of critical exponents associated with ran...
In this paper, we study the abundance of self-avoiding paths of a given length on a supercritical pe...