Problems of unique determination of domains by the relative metrics on their boundaries (Q2399798)

This paper is a survey on the problem of the unique determination of surfaces that are the boundaries of convex domains. The first part of the article is devoted to the case of unique determination of domains by the condition of the global isometry of their boundaries in the relative metrics. Next, some results concerning rigidity problems for the boundaries of \(n\)-dimensional connected submanifolds with boundaries in \(n\)-dimensional smooth connected Riemannian manifolds without boundaries are presented. The last part of the paper is mainly devoted to giving a complete description of conditions that are necessary and sufficient for a plane domain with smooth boundary to be uniquely determined by the condition of local isometry of their boundaries in the class of all domains with smooth boundaries.