Add to ORKGWe determine the `exact Hausdorff dimension' for a class of multi-type random constructions. As an application, we consider a model of self-avoiding walk called the `branching model' on the multi-dimensional Sierpinski gasket. We take its continuum limit and determine the exact Hausdorff dimension of the path of the limit process
The scaling properties of linear polymers on deterministic fractal structures, modeled by self-avoid...
The scaling properties of linear polymers on deterministic fractal structures, modeled by self-avoid...
. For a large class of Markov operators on trees we prove the formula HD = h=l connecting the Haus...
We determine the `exact Hausdorff dimension\u27 for a class of multi-type random constructions. As a...
Abstract. We determine the ‘exact Hausdorff dimension ’ for a class of multi-type random constructio...
We consider the evolution of a connected set in Euclidean space carried by a periodic incompressible...
We study self-avoiding paths on the three-dimensional pre-Sierpinski gasket. We prove the existence ...
Abstract. We study a family of self-avoiding walks on the 2- and 3-dimensional Sierpinski gasket, re...
We compute the Hausdorff dimension of any random statistically self-affine Sierpinski sponge K ⊂ R k...
The following facts about self-avoiding walks (using either the uniform measure or the loop erased m...
International audienceThis work introduces two new notions of dimension, namely the unimodular Minko...
Abstract. Let X1,..., XN denote N independent, symmetric Lévy processes on Rd. The corresponding ad...
Abstract. Let X1,..., XN denote N independent, symmetric Lévy processes on Rd. The corresponding ad...
The random walk and the self-avoiding walk in finitely ramified fractal spaces have been studied. Th...
The scaling properties of linear polymers on deterministic fractal structures, modeled by self-avoid...
The scaling properties of linear polymers on deterministic fractal structures, modeled by self-avoid...
The scaling properties of linear polymers on deterministic fractal structures, modeled by self-avoid...
. For a large class of Markov operators on trees we prove the formula HD = h=l connecting the Haus...
We determine the `exact Hausdorff dimension\u27 for a class of multi-type random constructions. As a...
Abstract. We determine the ‘exact Hausdorff dimension ’ for a class of multi-type random constructio...
We consider the evolution of a connected set in Euclidean space carried by a periodic incompressible...
We study self-avoiding paths on the three-dimensional pre-Sierpinski gasket. We prove the existence ...
Abstract. We study a family of self-avoiding walks on the 2- and 3-dimensional Sierpinski gasket, re...
We compute the Hausdorff dimension of any random statistically self-affine Sierpinski sponge K ⊂ R k...
The following facts about self-avoiding walks (using either the uniform measure or the loop erased m...
International audienceThis work introduces two new notions of dimension, namely the unimodular Minko...
Abstract. Let X1,..., XN denote N independent, symmetric Lévy processes on Rd. The corresponding ad...
Abstract. Let X1,..., XN denote N independent, symmetric Lévy processes on Rd. The corresponding ad...
The random walk and the self-avoiding walk in finitely ramified fractal spaces have been studied. Th...
The scaling properties of linear polymers on deterministic fractal structures, modeled by self-avoid...
The scaling properties of linear polymers on deterministic fractal structures, modeled by self-avoid...
The scaling properties of linear polymers on deterministic fractal structures, modeled by self-avoid...
. For a large class of Markov operators on trees we prove the formula HD = h=l connecting the Haus...