Let M be a random measure and L be an elliptic pseudo-differential operator on Rd. We study the solution of the stochastic problem LX = M, X(O) = O when some homogeneity and integrability conditions are assumed. If M is a Gaussian measure the process X belongs to the class of Elliptic Gaussian Processes which has already been studied. Here the law of M is not necessarily Gaussian. We characterize the solutions X which are self-similar and with stationary increments in terms of the driving mcasure M. Then we use appropriate wavelet bases to expand these solutions and we give regularity results. In the last section it is shown how a percolation forest can help with constructing a self-similar Elliptic Process with non stable law
21 pagesWe study a class of self similar processes with stationary increments belonging to higher or...
AbstractA self-similar process Z(t) has stationary increments and is invariant in law under the tran...
Stationary systems modelled by elliptic partial differential equations---linear as well as nonlinear...
We study the Gaussian random fields indexed by Rd whose covariance is defined in all generality as t...
Introduction A stochastic process Y (t) is defined as self-similar with self-similarity parameter H...
International audienceThis paper presents a construction and the analysis of a class of non-Gaussian...
This paper concerns the homogenization of a one-dimensional elliptic equation with oscillatory rando...
A stochastic process Y (t) is dened as self-similar with self-similarity parameter H if for any posi...
AbstractWe present some variants of stochastic homogenization theory for scalar elliptic equations o...
We consider a Gaussian process $P$ on the space of distributions generated by a polynomial in the La...
We prove regularity and stochastic homogenization results for certain degenerate elliptic equations ...
AbstractA stochastic process on a finite-dimensional real vector space is operator-self-similar if a...
We present some variants of stochastic homogenization theory for scalar elliptic equations of the fo...
The qualitative theory of stochastic homogenization of uniformly elliptic linear (but possibly non-s...
Many science and engineering applications are impacted by a significant amount of uncertainty in the...
21 pagesWe study a class of self similar processes with stationary increments belonging to higher or...
AbstractA self-similar process Z(t) has stationary increments and is invariant in law under the tran...
Stationary systems modelled by elliptic partial differential equations---linear as well as nonlinear...
We study the Gaussian random fields indexed by Rd whose covariance is defined in all generality as t...
Introduction A stochastic process Y (t) is defined as self-similar with self-similarity parameter H...
International audienceThis paper presents a construction and the analysis of a class of non-Gaussian...
This paper concerns the homogenization of a one-dimensional elliptic equation with oscillatory rando...
A stochastic process Y (t) is dened as self-similar with self-similarity parameter H if for any posi...
AbstractWe present some variants of stochastic homogenization theory for scalar elliptic equations o...
We consider a Gaussian process $P$ on the space of distributions generated by a polynomial in the La...
We prove regularity and stochastic homogenization results for certain degenerate elliptic equations ...
AbstractA stochastic process on a finite-dimensional real vector space is operator-self-similar if a...
We present some variants of stochastic homogenization theory for scalar elliptic equations of the fo...
The qualitative theory of stochastic homogenization of uniformly elliptic linear (but possibly non-s...
Many science and engineering applications are impacted by a significant amount of uncertainty in the...
21 pagesWe study a class of self similar processes with stationary increments belonging to higher or...
AbstractA self-similar process Z(t) has stationary increments and is invariant in law under the tran...
Stationary systems modelled by elliptic partial differential equations---linear as well as nonlinear...