Boundary regularity of weakly coupled vectorial almost-minimizers for Alt-Caffarelli functionals with non-standard growth
Abstract
For a fixed constant λ > 0 and a bounded Lipschitz domain ⊂ Rn with n ≥ 2, we establish that almost-minimizers (functions satisfying a sort of variational inequality) of the Alt-Caffarelli type functional \[ JG( v;) ∫ (Σi=1mG(|∇ vi(x)|) + λ \| v|>0\(x)) dx , \] where v = (v1, …, vm) and m ∈ N, exhibit optimal (up-to-the boundary) Lipschitz continuity, where G is a N-function satisfying specific growth conditions. Our work extends the recent regularity results for weakly coupled vectorial almost-minimizers for the p-Laplacian addressed in BFS24, thereby providing new insights and approaches applicable to a wide class of non-linear one or two-phase free boundary problems with non-standard growth. Our findings remain novel and significant even in the scalar setting and for minimizers of the type considered by Mart\'inez--Wolanski MW08 and da Silva et al. daSSV2024.
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