Improved regularity estimates for Hardy-H\'enon-type equations driven by the ∞-Laplacian

Abstract

In this work, we establish sharp and improved regularity estimates for viscosity solutions of Hardy-H\'enon-type equations with possibly singular weights and strong absorption governed by the ∞-Laplacian ∞ u(x) = |x|αu+m(x) in B1, under suitable assumptions on the data. In this setting, we derive an explicit regularity exponent that depends only on universal parameters. Additionally, we prove non-degeneracy properties, providing further geometric insights into the nature of these solutions. Our regularity estimates not only improve but also extend, to some extent, the previously obtained results for zero-obstacle and dead-core problems driven by the ∞-Laplacian. As an application of our findings, we also address some Liouville-type results for this class of equations.

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