AbstractBy using the Nash inequality and a monotonicity approximation argument, existence and uniqueness of strong solutions are proved for a class of non-monotone stochastic generalized porous media equations. Moreover, we prove for a large class of stochastic PDE that the solutions stay in the smaller L2-space provided the initial value does, so that some recent results in the literature are considerably strengthened
We prove global well-posedness in the strong sense for stochastic generalized porous media equations...
Röckner M, Wu W, Xie Y. Stochastic porous media equation on general measure spaces with increasing L...
Existence and uniqueness of solutions to the stochastic porous me-dia equation dX − ∆ψ(X)dt = XdW in...
By using the Nash inequality and a monotonicity approximation argument, ex-istence and uniqueness of...
By using the Nash inequality and a monotonicity approximation argument, ex-istence and uniqueness of...
AbstractBy using the Nash inequality and a monotonicity approximation argument, existence and unique...
Barbu V, Da Prato G, Röckner M. Existence of strong solutions for stochastic porous media equation u...
Explicit conditions are presented for the existence, uniqueness and ergodicity of the strong solutio...
Explicit conditions are presented for the existence, uniqueness, and ergodicity of the strong soluti...
Existence of strong solutions for Stochastic porous media equation under general monotonicity condit...
Da Prato G, Röckner M, Rozovskii BL, Wang F-Y. Strong solutions of stochastic generalized porous med...
We present a generalization of Krylov-Rozovskii’s result on the existence and unique-ness of solutio...
Barbu V, Da Prato G, Röckner M. Stochastic Porous Media Equations and Self-Organized Criticality. Co...
Röckner M, Wang F-Y, Zhang T. Stochastic generalized porous media equations with reflection. Stochas...
International audienceWe prove new L2-estimates and regularity results for generalized porous media ...
We prove global well-posedness in the strong sense for stochastic generalized porous media equations...
Röckner M, Wu W, Xie Y. Stochastic porous media equation on general measure spaces with increasing L...
Existence and uniqueness of solutions to the stochastic porous me-dia equation dX − ∆ψ(X)dt = XdW in...
By using the Nash inequality and a monotonicity approximation argument, ex-istence and uniqueness of...
By using the Nash inequality and a monotonicity approximation argument, ex-istence and uniqueness of...
AbstractBy using the Nash inequality and a monotonicity approximation argument, existence and unique...
Barbu V, Da Prato G, Röckner M. Existence of strong solutions for stochastic porous media equation u...
Explicit conditions are presented for the existence, uniqueness and ergodicity of the strong solutio...
Explicit conditions are presented for the existence, uniqueness, and ergodicity of the strong soluti...
Existence of strong solutions for Stochastic porous media equation under general monotonicity condit...
Da Prato G, Röckner M, Rozovskii BL, Wang F-Y. Strong solutions of stochastic generalized porous med...
We present a generalization of Krylov-Rozovskii’s result on the existence and unique-ness of solutio...
Barbu V, Da Prato G, Röckner M. Stochastic Porous Media Equations and Self-Organized Criticality. Co...
Röckner M, Wang F-Y, Zhang T. Stochastic generalized porous media equations with reflection. Stochas...
International audienceWe prove new L2-estimates and regularity results for generalized porous media ...
We prove global well-posedness in the strong sense for stochastic generalized porous media equations...
Röckner M, Wu W, Xie Y. Stochastic porous media equation on general measure spaces with increasing L...
Existence and uniqueness of solutions to the stochastic porous me-dia equation dX − ∆ψ(X)dt = XdW in...