Regularity up to the boundary for singularly perturbed fully nonlinear elliptic equations
Abstract
In this article we are interested in studying regularity up to the boundary for one-phase singularly perturbed fully nonlinear elliptic problems, associated to high energy activation potentials, namely F(X, ∇ u, D2 u) = ζ(u) in ⊂ n where ζ behaves asymptotically as the Dirac measure δ0 as goes to zero. We shall establish global gradient bounds independent of the parameter .
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