Martin Ulmer
Published 2024-08-22Version 1
We show small and large Carleson perturbation results for the parabolic regularity boundary value problem with boundary data in $\dot{L}_{1,1/2}^p$. The operator we consider is $L:=\partial_t -\mathrm{div}(A\nabla\cdot)$ and the domains are parabolic cylinders $\Omega=\mathcal{O}\times\mathbb{R}$, where $\mathcal{O}$ is a chord arc domain or Lipschitz domain.
On the regularity problem for parabolic operators and the role of half-time derivative
The $L^p$ Poisson-Neumann problem and its relation to the Neumann problem
Perturbation theory for homogeneous evolution equations
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