1. Introduction. Wiener's criterion for the regularity of a boundary point with respect to the Dirichlet problem for the Laplace equation [W] has been extended to various classes of elliptic and parabolic partial differential equations. They include linear divergence and nondivergence equations with discontinuous coefficients, equations with degenerate quadratic form, quasilinear and fully nonlinear equations, as well as equations on Riemannian manifolds, graphs, groups, and metric spaces (see [LSW][TW] to mention only a few). A common feature of these equations is that all of them are of second order, and Wiener type characterizations for higher order equations have been unknown so far. Indeed, the increase of the order results in the loss of the maximum principle, Harnack's inequality, barrier techniques, and level truncation arguments, which are ingredients in different proofs related to the Wiener test for the second order equations.In the present work we extend Wiener's result to elliptic differential operators L(∂) of order 2m in the Euclidean space R n with constant real coefficients
Abstract. Necessary and sufficient conditions are obtained for the continuity and compactness of the imbedding operators Gagliardo [3] in the case where the domain Ω ⊂ R n has the cone property. If l is a positive integer, 1 ≤ p < ∞, and lp < n, then the exponent q in the above imbedding takes the maximal possible value q = np/(n − lp).In [12], Maz ya obtained a necessary and sufficient condition for the continuity of the imbedding operatorn . These conditions are either isoperimetric (for p = 1), or capacitary (for p > 1) inequalities. As an application of these results, a maximal exponent q was found for which W
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