Geometric regularity estimates for quasi-linear elliptic models in non-divergence form with strong absorption
Abstract
In this manuscript, we investigate geometric regularity estimates for problems governed by quasi-linear elliptic models in non-divergence form, which may exhibit either degenerate or singular behavior when the gradient vanishes, under strong absorption conditions of the form: \[ |∇ u(x)|γ pN u(x) = f(x, u) in B1, \] where γ > -1, p ∈ (1, ∞), and the mapping u f(x, u) a(x) u+m (with m ∈ [0, γ + 1)) does not decay sufficiently fast at the origin. This condition allows for the emergence of plateau regions, i.e., a priori unknown subsets where the non-negative solution vanishes identically. We establish improved geometric Cloc regularity along the set F0 = ∂ \u > 0\ B1 (the free boundary of the model) for a sharp value of 1, which is explicitly determined in terms of the structural parameters. Additionally, we derive non-degeneracy results and other measure-theoretic properties. Furthermore, we prove a sharp Liouville theorem for entire solutions exhibiting controlled growth at infinity.
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