Upper bounds for the relaxed area of S1-valued Sobolev maps and its countably subadditive interior envelope
Abstract
Given a bounded open connected Lipschitz set ⊂ R2, we show that the relaxed Cartesian area functional A(u,) of a map u∈ W1,1(; S1) is finite, and provide a useful upper bound for its value. Using this estimate, we prove a modified version of a De Giorgi conjecture [17] adapted to W1,1(; S1), on the largest countably subadditive set function A(u, ·) smaller than or equal to A(u,·).
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