Parabolic PDEs with Dynamic Data under a Bounded Slope Condition
Abstract
We establish the existence of Lipschitz continuous solutions to the Cauchy Dirichlet problem for a class of evolutionary partial differential equations of the form ∂tu-divx ∇ f(∇ u)=0 in a space-time cylinder T=× (0,T), subject to time-dependent boundary data g ∂PT R prescribed on the parabolic boundary. The main novelty in our analysis is a time-dependent version of the classical bounded slope condition, imposed on the boundary data g along the lateral boundary ∂× (0,T). More precisely, we require that for each fixed t∈ [0,T), the graph of g(· ,t) over ∂ admits supporting hyperplanes with slopes that may vary in time but remain uniformly bounded. The key to handling time-dependent data lies in constructing more flexible upper and lower barriers.
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