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Localization and interpolation of parabolic $L^p$ Neumann problems
Published 18 Jan 2026 in math.AP and math.CA | (2601.12429v1)
Abstract: We show a localization estimate for local solutions to the parabolic equation $-\partial_t u+\mbox{div} (A\nabla u)=0$ with zero Neumann data, assuming that the $Lp$ Neumann problem and $L{p'}$ Dirichlet problem for the adjoint operator are solvable in a Lipschitz cylinder for some $p\in(1,\infty)$. Using this result, we establish the solvability of the Neumann problem in the atomic Hardy space for parabolic operators with bounded, measurable, time-dependent coefficients, and hence obtain the interpolation of solvability of the $Lp$ Neumann problem.
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