Shape analysis in Schauder spaces of the energy of heat problems in perturbed annular domains
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Abstract
This paper is devoted to the shape analysis of the energy of boundary value problems for the heat equation in a bounded perforated domain $\Omega^o \setminus \overline{\Omega^i[\phi]}$ of $\mathbb{R}^n$, where the outer boundary is fixed, and the inner boundary is given by a $C^{1,\alpha}$-perturbation $\phi$ of the boundary of a reference cavity.
Under standard Dirichlet or Neumann boundary conditions, we prove that, in a suitable neighborhood of the identity $\phi_0$, the domain-to-energy map is of class $C^{\infty}$.
The proof is based on the construction of a global diffeomorphism, smoothly depending on $\phi$, from the reference annulus onto the perturbed one, on a decomposition of the fixed domain into regions near, intermediate to, and far from the cavity, and on the smooth dependence of the layer heat potentials upon support perturbations.