Weighted W
1, p (·)-Regularity for Degenerate Elliptic Equations in Reifenberg Domains
Keyword(s):
Abstract Let w be a Muckenhoupt A 2(ℝ n ) weight and Ω a bounded Reifenberg flat domain in ℝ n . Assume that p (·):Ω → (1, ∞) is a variable exponent satisfying the log-Hölder continuous condition. In this article, the authors investigate the weighted W 1, p (·)(Ω, w)-regularity of the weak solutions of second order degenerate elliptic equations in divergence form with Dirichlet boundary condition, under the assumption that the degenerate coefficients belong to weighted BMO spaces with small norms.
2005 ◽
Vol 22
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pp. 11-23
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Multiple solutions for semi-linear corner degenerate elliptic equations with singular potential term
2016 ◽
Vol 19
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pp. 1650043
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2012 ◽
Vol 278
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pp. 1-9
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1969 ◽
Vol 8
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pp. 1-32
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Keyword(s):
1987 ◽
Vol 39
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pp. 3088-3148
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2015 ◽
Vol 258
(4)
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pp. 1229-1251
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1995 ◽
Vol 20
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pp. 129-178
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