Quantitative symmetry in a mixed Serrin-type problem for a constrained torsional rigidity (2210.10288v2)

Abstract: We consider a mixed boundary value problem in a domain $\Omega$ contained in a half-ball $B_+$ and having a portion $\bar{T}$ of its boundary in common with the curved part of $\partial B_+$. The problem has to do with some sort of constrained torsional rigidity. In this situation, the relevant solution $u$ satisfies a Steklov condition on $T$ and a homogeneous Dirichlet condition on $\Sigma = \partial\Omega \setminus \bar{T} \subset B_+$. We provide an integral identity that relates (a symmetric function of) the second derivatives of the solution in $\Omega$ to its normal derivative $u_\nu$ on $\Sigma$. A first significant consequence of this identity is a rigidity result under a quite weak overdetermining integral condition for $u_\nu$ on $\Sigma$: in fact, it turns out that $\Sigma$ must be a spherical cap that meets $T$ orthogonally. This result returns the one obtained by J. Guo and C. Xia under the stronger pointwise condition that the values of $u_\nu$ be constant on $\Sigma$. A second important consequence is a set of stability bounds, which quantitatively measure how $\Sigma$ is far uniformly from being a spherical cap, if $u_\nu$ deviates from a constant in the norm $L^1(\Sigma)$.