Litcius/Paper detail

Elliptic Equations with Degenerate Weights

Anna Kh. Balci, Lars Diening, Raffaella Giova, Antonia Passarelli di Napoli

2022SIAM Journal on Mathematical Analysis34 citationsDOI

Abstract

We obtain new local Calderón--Zygmund estimates for elliptic equations with matrix-valued weights for linear as well as nonlinear equations. We introduce a novel log-BMO condition on the weight $\mathbb M$. In particular, we assume smallness of the logarithm of the matrix-valued weight in BMO. This allows us to include degenerate, discontinuous weights. The assumption on the smallness parameter is sharp and linear in terms of the integrability exponent of the gradient. This is a novelty even in the linear setting with nondegenerate weights compared to previously known results, where the dependency was exponential. We provide examples that show the sharpness of the estimates in terms of the log-BMO norm.

Topics & Concepts

MathematicsDegenerate energy levelsLogarithmExponentMathematical analysisMatrix (chemical analysis)Nonlinear systemExponential functionNorm (philosophy)Coefficient matrixPure mathematicsEigenvalues and eigenvectorsPolitical scienceComposite materialMaterials sciencePhilosophyQuantum mechanicsLawLinguisticsPhysicsAdvanced Mathematical Physics ProblemsAdvanced Harmonic Analysis ResearchNonlinear Partial Differential Equations