Add to ORKGWe consider a system of stochastic partial differential equations modeling heat conduction in a non-linear medium. We show global existence of solutions for the system in Sobolev spaces of low regularity, including spaces with norm beneath the energy norm. For the special case of thermal equilibrium, we also show the existence of an invariant measure (Gibbs state)
AbstractWe consider a nonlinear wave equation utt=Δu+f(u)+g(u)W˙ on Rd driven by a spatially homogen...
In this paper, relations between the asymptotic behavior for a stochastic wave equation and a heat e...
Completing the analysis in Scarpa (Math Models Methods Appl Sci 30(5): 991–1031 2020), we investigat...
AbstractWe consider a system of stochastic partial differential equations modeling heat conduction i...
We consider a system of stochastic partial differential equations modeling heat conduction in a non-...
textabstractThermal bath coupling mechanisms as utilized in molecular dynamics are applied to partia...
We study the existence and regularity of densities for the solution of a nonlinear heat diffusion wi...
We consider regularity properties of stochastic kinetic equations with multiplicative noise and drif...
International audienceWe consider regularity properties of stochastic kinetic equations with multipl...
The paper provides necessary and sufficient conditions under which stochas-tic heat and wave equatio...
Da Prato G, Röckner M. Weak solutions to stochastic porous media equations. Journal of Evolution Equ...
AbstractIn this paper we examine the problem of the heat equation with non-linear boundary condition...
Let M be a compact Riemannian homogeneous space (e.g. a Euclidean sphere). We prove existence of a g...
We survey recent results concerning existence and uniqueness of solutions of non-linear stochastic w...
We prove existence of weak solutions (in the probabilistic sense) for a general class of stochastic ...
AbstractWe consider a nonlinear wave equation utt=Δu+f(u)+g(u)W˙ on Rd driven by a spatially homogen...
In this paper, relations between the asymptotic behavior for a stochastic wave equation and a heat e...
Completing the analysis in Scarpa (Math Models Methods Appl Sci 30(5): 991–1031 2020), we investigat...
AbstractWe consider a system of stochastic partial differential equations modeling heat conduction i...
We consider a system of stochastic partial differential equations modeling heat conduction in a non-...
textabstractThermal bath coupling mechanisms as utilized in molecular dynamics are applied to partia...
We study the existence and regularity of densities for the solution of a nonlinear heat diffusion wi...
We consider regularity properties of stochastic kinetic equations with multiplicative noise and drif...
International audienceWe consider regularity properties of stochastic kinetic equations with multipl...
The paper provides necessary and sufficient conditions under which stochas-tic heat and wave equatio...
Da Prato G, Röckner M. Weak solutions to stochastic porous media equations. Journal of Evolution Equ...
AbstractIn this paper we examine the problem of the heat equation with non-linear boundary condition...
Let M be a compact Riemannian homogeneous space (e.g. a Euclidean sphere). We prove existence of a g...
We survey recent results concerning existence and uniqueness of solutions of non-linear stochastic w...
We prove existence of weak solutions (in the probabilistic sense) for a general class of stochastic ...
AbstractWe consider a nonlinear wave equation utt=Δu+f(u)+g(u)W˙ on Rd driven by a spatially homogen...
In this paper, relations between the asymptotic behavior for a stochastic wave equation and a heat e...
Completing the analysis in Scarpa (Math Models Methods Appl Sci 30(5): 991–1031 2020), we investigat...