Regularity estimates for quasilinear elliptic PDEs in non-divergence form with Hamiltonian terms and applications

Abstract

In this manuscript, we investigate regularity estimates for a class of quasilinear elliptic equations in the non-divergence form that may exhibit degenerate behavior at critical points of their gradient. The prototype equation under consideration is |∇ u(x)|θ( pN u(x) + B(x), ∇ u ) + (x) |∇ u(x)|σ = f(x) in B1, where θ > 0, σ ∈ (θ, θ + 1), and p ∈ (1, ∞). The coefficients B and are bounded continuous functions, and the source term f ∈ C0(B1) L∞(B1). We establish interior C1,αloc regularity for some α ∈ (0,1), along with sharp quantitative estimates at critical points of existing solutions. Additionally, we prove a non-degeneracy property and establish both a Strong Maximum Principle and a Hopf-type lemma. In the final part, we apply our analytical framework to study existence, uniqueness, improved regularity, and non-degeneracy estimates for H\'enon-type models in the non-divergence form. These models incorporate strong absorption terms and linear/sublinear Hamiltonian terms and are of independent mathematical interest. Our results partially extend (for the non-variational quasilinear setting) the recent work by the second author in collaboration with Nornberg [Calc. Var. Partial Differential Equations 60 (2021), no. 6, Paper No. 202, 40 pp.], where sharp quantitative estimates were established for the fully nonlinear uniformly elliptic setting with Hamiltonian terms.

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