Sharp and improved regularity estimates for weighted quasilinear elliptic equations of p-Laplacian type and applications
Abstract
In this manuscript, we obtain sharp and improved regularity estimates for weak solutions of weighted quasilinear elliptic models of Hardy-H\'enon-type, featuring an explicit regularity exponent depending only on universal parameters. Our approach is based on geometric tangential methods and uses a refined oscillation mechanism, compactness, and scaling techniques. In some specific scenarios, we establish higher regularity estimates and non-degeneracy properties, providing further geometric insights into such solutions. Our regularity estimates both enhance and, to some extent, extend the results arising from the Cp conjecture for the p-Laplacian with a bounded source term. As applications of our results, we address some Liouville-type results for our class of equations. Finally, our results are noteworthy, even in the simplest model case governed by the p-Laplacian with regular coefficients: div( |∇ u|p-2A(|x|) ∇ u) = |x|αu+m(x) in B1 under suitable assumptions on the data, with possibly singular weight h(|x|) = |x|α, which includes the Matukuma and Batt-Faltenbacher-Horst's equations as toy models.
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