Random attractors for stochastic porous media equations perturbed by space-time linear multiplicative noise
Abstract
Unique existence of solutions to porous media equations driven by continuous linear multiplicative space-time rough signals is proven for initial data in L1( O) on bounded domains O. The generation of a continuous, order-preserving random dynamical system on L1( O) and the existence of a random attractor for stochastic porous media equations perturbed by linear multiplicative noise in space and time is obtained. The random attractor is shown to be compact and attracting in L∞( O) norm. Uniform L∞ bounds and uniform space-time continuity of the solutions is shown. General noise including fractional Brownian motion for all Hurst parameters is treated and a pathwise Wong-Zakai result for driving noise given by a continuous semimartingale is obtained. For fast diffusion equations driven by continuous linear multiplicative space-time rough signals, existence of solutions is proven for initial data in Lm+1( O).
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