Author: Mamadou Abdoul DiopPublisher:
ISBN:
Category :
Languages : en
Pages : 84
Book Description
This thesis is devoted to some problems connected to the theory of homogenization of random parabolic operators with large potential. It is assumed that the said operators have a periodic spatial microstructure whose characteristics are rapidly oscillating stationary random process in time. Two different cases of non diffusive scaling are addressed. Namely, the case when the oscillation in time is faster than that in spatial variables and the opposite case when the time oscillation is slower than that the spatial one. It is shown that in the former case, under certain mixing conditions,the corresponding Cauchy problem admits homogenization and its solution converges in probability to a solution of a deterministic semilinear operator. In the latter case the limit equation is a stochastic partial differential equation. Here a solution of the original Cauchy problem converges in law in the energy functional space, while con vergence in probability does not takes place. The thesis consists of an introduction and three different parts. In the introduction we give an elementary presentation of the basic ideas in the homogenization theory. The first chapter, deals with the results contained in this thesis. In the second chapter the operators with Markov driving processes are considered. In the second part the operators with non Markov coefficients are investigated.
