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This Kato square root property is indeed true from abstract principles and without any regularity on the domain since $-\Delta_D$ is selfadjoint. (For $H^1_0(\Omega)$ being the closure of test functio …

mathrm{dom}_{L^2(\Omega)}(-\Delta_D)^{(1-\theta)\alpha}$$ and the elliptic regularity result $$\mathrm{dom}_{L^2(\Omega)}(-\Delta_D) = H^2(\Omega) \cap H^1_0(\Omega),$$ which are valid for the Dirichlet Laplacian … also follows from the first formula for $\alpha = \frac12$ and $$\mathrm{dom}_{L^2(\Omega)}(-\Delta_D)^{\frac12} = H^1_0(\Omega),$$ which is the rather famous Kato square root property for the Dirichlet Laplacian …