An Lp-theory for the stochastic heat equation on angular domains in R2 with mixed weights
Abstract
We establish a refined Lp-estimate (p≥ 2) for the stochastic heat equation on angular domains in R2 with mixed weights based on both, the distance to the boundary and the distance to the vertex. This way we can capture both causes for singularities of the solution: the incompatibility of noise and boundary condition on the one hand and the influence of boundary singularities (here, the vertex) on the other hand. Higher order Lp-Sobolev regularity with mixed weights is also established.
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