Add to ORKGp. 1-9This work analyzes a percolation model on the diamond hierarchical lattice (DHL), where the percolation transition is retarded by the inclusion of a probability of erasing specific connected structures. It has been inspired by the recent interest on the existence of other universality classes of percolation models. The exact scale invariance and renormalization properties of DHL leads to recurrence maps, from which analytical expressions for the critical exponents and precise numerical results in the limit of very large lattices can be derived. The critical exponents ν and β of the investigated model vary continuously as the erasing probability changes. An adequate choice of the erasing probability leads to the result ν=∞, like in som...
We consider the minimal paths on a hierarchical diamond lattice, where bonds are assigned a random w...
AbstractWe study a natural dependent percolation model introduced by Häggström. Consider subcritical...
Percolation is the paradigm for random connectivity and has been one of the most applied statistical...
In this thesis we study various problems in dependent percolation theory. In the first part of this ...
Wepropose a statistical model defined on tetravalent three-dimensional lattices in general and the t...
Percolation theory is a useful tool when modeling the random interconnectivity of the microscopic el...
Percolation theory is a useful tool when modeling the random interconnectivity of the microscopic el...
A major breakthrough in percolation was the 1990 result by Hara and Slade proving mean-field behavio...
We studied in this thesis the critical behaviours of percolation and directed percolation models usi...
This is the first of two papers on the critical behaviour of bond percolation models in high dimensi...
Many 2D critical lattice models are believed to have conformally invariant scal-ing limits. This bel...
We define a new percolation model by generalising the FK representation of the Ising model, and show...
We consider the minimal paths on a hierarchical diamond lattice, where bonds are assigned a random w...
We examine the percolation model on Zd by an approach involving lattice animals and their surface-ar...
Résumé. 2014 On présente une étude de deux types de percolation pour différents réseaux et à plusieu...
We consider the minimal paths on a hierarchical diamond lattice, where bonds are assigned a random w...
AbstractWe study a natural dependent percolation model introduced by Häggström. Consider subcritical...
Percolation is the paradigm for random connectivity and has been one of the most applied statistical...
In this thesis we study various problems in dependent percolation theory. In the first part of this ...
Wepropose a statistical model defined on tetravalent three-dimensional lattices in general and the t...
Percolation theory is a useful tool when modeling the random interconnectivity of the microscopic el...
Percolation theory is a useful tool when modeling the random interconnectivity of the microscopic el...
A major breakthrough in percolation was the 1990 result by Hara and Slade proving mean-field behavio...
We studied in this thesis the critical behaviours of percolation and directed percolation models usi...
This is the first of two papers on the critical behaviour of bond percolation models in high dimensi...
Many 2D critical lattice models are believed to have conformally invariant scal-ing limits. This bel...
We define a new percolation model by generalising the FK representation of the Ising model, and show...
We consider the minimal paths on a hierarchical diamond lattice, where bonds are assigned a random w...
We examine the percolation model on Zd by an approach involving lattice animals and their surface-ar...
Résumé. 2014 On présente une étude de deux types de percolation pour différents réseaux et à plusieu...
We consider the minimal paths on a hierarchical diamond lattice, where bonds are assigned a random w...
AbstractWe study a natural dependent percolation model introduced by Häggström. Consider subcritical...
Percolation is the paradigm for random connectivity and has been one of the most applied statistical...