On uniqueness in Steiner problem
Abstract
We prove that the set of -point configurations for which the solution of the planar Steiner problem is not unique has the Hausdorff dimension at most (as a subset of ). Moreover, we show that the Hausdorff dimension of the set of -point configurations on which at least two locally minimal trees have the same length is also at most . Methods we use essentially require rely upon the theory of subanalytic sets developed in~\cite{bierstone1988semianalytic}. Motivated by this approach we develop a general setup for the similar problem of uniqueness of the Steiner tree where the Euclidean plane is replace by an arbitrary analytic Riemannian manifold . In this setup we argue that the set of configurations possessing two locally-minimal trees of the same length either has the dimension or has a non-empty interior. We provide an example of a two-dimensional surface for which the last alternative holds. In addition to abovementioned results, we study the set of set of -point configurations for which there is a unique solution of the Steiner problem in . We show that this set is path-connected.
Cite
@article{arxiv.1809.01463,
title = {On uniqueness in Steiner problem},
author = {Mikhail Basok and Danila Cherkashin and Nikita Rastegaev and Yana Teplitskaya},
journal= {arXiv preprint arXiv:1809.01463},
year = {2023}
}