Renormalized solutions for stochastic p-Laplace equations with L1-initial data: The multiplicative case
Abstract
We consider a p-Laplace evolution problem with multiplicative noise on a bounded domain D ⊂ Rd with homogeneous Dirichlet boundary conditions for 1<p< ∞. The random initial data is merely integrable. Consequently, the key estimates are available with respect to truncations of the solution. We introduce the notion of renormalized solutions for multiplicative stochastic p-Laplace equations with L1-initial data and study existence and uniqueness of solutions in this framework.
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