On the normalized $p$-parabolic equation in arbitrary domains
Abstract: The boundary regularity for the normalized $p$-parabolic equation $u_t =\frac{1}{p}|Du|{2-p}\Delta_pu$ is studied. Perron's method is used to construct solutions in arbitrary domains. We classify the regular boundary points in terms of barrier functions, and prove an Exterior Sphere result. A fundamental solution is identified. A Petrovsky criterion is established, and we examine the convergence of solutions as $p \to \infty$.
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