Lipschitz regularity of almost minimizers in a Bernoulli problem with non-standard growth

Abstract

In this work we establish the optimal Lipschitz regularity for non-negative almost minimizers of the one-phase Bernoulli-type functional JG(u,) := ∫ (G(|∇ u|)+\u>0\)\,dx where ⊂ Rn is a bounded domain and G: [0, ∞) [0, ∞) is a Young function with G=g satisfying the Lieberman's classical conditions. Moreover, of independent mathematical interest, we also address a H\"oder regularity characterization via Campanato-type estimates in the context of Orlicz modulars, which is new for such a class of non-standard growth functionals.

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