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A $W^n_2$-Theory of Stochastic Parabolic Partial Differential Systems on $C^1$-domains

In this article we present a $W^n_2$-theory of stochastic parabolic partial differential systems. In particular, we focus on non-divergent type. The space domains we consider are $\bR^d$, $\bR^d_+$ and eventually general bounded $C^1$-domains $\mathcal{O}$. By the nature of stochastic parabolic equations we need weighted Sobolev spaces to prove the existence and the uniqueness. In our choice of spaces we allow the derivatives of the solution to blow up near the boundary and moreover the coefficients of the systems are allowed to oscillate to a great extent or blow up near the boundary.

preprint2011arXivOpen access
Kyeong-Hun KimKijung Lee
math.APmath.PR
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Kyeong-Hun KimKijung Lee

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