Lipschitz regularity of a weakly coupled vectorial almost-minimizers for the p-Laplacian
Abstract
For a given constant λ > 0 and a bounded Lipschitz domain D ⊂ Rn (n ≥ 2), we establish that almost-minimizers of the functional J(v; D) = ∫D Σi=1m |∇ vi(x) |p+ λ \|v |>0\ (x) \, dx, 1<p<∞, where v = (v1, ·s, vm), and m ∈ N, exhibit optimal Lipschitz continuity in compact sets of D. Furthermore, assuming p ≥ 2 and employing a distinctly different methodology, we tackle the issue of boundary Lipschitz regularity for v. This approach simultaneously yields alternative proof for the optimal local Lipschitz regularity for the interior case.
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