AbstractThe purpose of the paper is to extend the principal eigenvalue and principal eigenfunction theory for time independent and periodic parabolic equations to random and general nonautonomous ones. In the random case, a notion of principal Lyapunov exponent serving as an analog of principal eigenvalue is introduced. It is shown that the principal Lyapunov exponent is deterministic and of simple multiplicity. It is also shown that there is a one-dimensional invariant random subbundle corresponding to the solutions that are globally defined and of the same sign, which serves as an analog of principal eigenfunction. In addition, monotonicity of the principal Lyapunov exponent with respect to the zero-order terms both in the equation and in...
In this paper we investigate homogenization results for the principal eigenvalue problem associated ...
In this short note, we describe some recent results on the pointwise existence of the Lyapunov expon...
We continue our study of the parabolic Anderson equation ¿u/¿t =k¿u+¿¿u for the space-time field u: ...
AbstractThe purpose of the paper is to extend the principal eigenvalue and principal eigenfunction t...
AbstractWe put forward a theory extending the notion of principal eigenfunction and principal eigenv...
AbstractWe investigate the spectral theory of the following general nonautonomous evolution equation...
Based on a recent characterization of the strong maximum principle, [3], this paper gives some perio...
Producción CientíficaThis paper deals with the study of principal Lyapunov exponents, principal Floq...
In this thesis the Lyapunov exponents of random dynamical systems are presented and investigated. Th...
This series of two papers is devoted to the study of the principal spectral theory of nonlocal dispe...
AbstractThis paper deals with the eigenvalue problem involving the p(x)-Laplacian of the form{−div(|...
AbstractHyperbolicity of an autonomous rest point is characterised by its linearization not having e...
AbstractIn this paper we are interested in the existence of a principal eigenfunction of a nonlocal ...
There are numerous studies focusing on the convergence of the principal eigenvalue $\lambda(s)$ as $...
We discuss certain recent metric space methods and some of the possibilities these methods provide, ...
In this paper we investigate homogenization results for the principal eigenvalue problem associated ...
In this short note, we describe some recent results on the pointwise existence of the Lyapunov expon...
We continue our study of the parabolic Anderson equation ¿u/¿t =k¿u+¿¿u for the space-time field u: ...
AbstractThe purpose of the paper is to extend the principal eigenvalue and principal eigenfunction t...
AbstractWe put forward a theory extending the notion of principal eigenfunction and principal eigenv...
AbstractWe investigate the spectral theory of the following general nonautonomous evolution equation...
Based on a recent characterization of the strong maximum principle, [3], this paper gives some perio...
Producción CientíficaThis paper deals with the study of principal Lyapunov exponents, principal Floq...
In this thesis the Lyapunov exponents of random dynamical systems are presented and investigated. Th...
This series of two papers is devoted to the study of the principal spectral theory of nonlocal dispe...
AbstractThis paper deals with the eigenvalue problem involving the p(x)-Laplacian of the form{−div(|...
AbstractHyperbolicity of an autonomous rest point is characterised by its linearization not having e...
AbstractIn this paper we are interested in the existence of a principal eigenfunction of a nonlocal ...
There are numerous studies focusing on the convergence of the principal eigenvalue $\lambda(s)$ as $...
We discuss certain recent metric space methods and some of the possibilities these methods provide, ...
In this paper we investigate homogenization results for the principal eigenvalue problem associated ...
In this short note, we describe some recent results on the pointwise existence of the Lyapunov expon...
We continue our study of the parabolic Anderson equation ¿u/¿t =k¿u+¿¿u for the space-time field u: ...