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Abstract

In this paper, we give a short proof of the Lorentz estimates for gradients of very weak solutions to the linear parabolic equations with the Muckenhoupt class $A_{q}$ -weights $\begin{matrix} u_{t} - div (A (x, t) \nabla u) = div (F), \end{matrix}$ in a bounded domain $Ω \times (0, T) \subset R^{N + 1}$ , where A has a small mean oscillation, and Ω is a Lipchistz domain with a small Lipschitz constant.

Keywords

Quasilinear parabolic equations maximal potential Reifenberg flat domain

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Gradient weighted norm inequalities for very weak solutions of linear parabolic equations with BMO coefficients

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