Universal Ahlfors--David regularity of Steiner trees

Abstract

The celebrated Steiner tree problem is the problem of finding a set St of minimum one-dimensional Hausdorff measure H (length) such that St A is connected, where A ⊂ Rd is a given compact set. Paolini and Stepanov provided very general existence and regularity results for the Steiner problem. Their main regularity result is that under a natural assumption, H(St) < ∞, for almost every >0 the set St := St B( A) is an embedded finite forest (acyclic graph). We give a quantitative regularity result by proving that the set St is Ahlfors--David regular with constants that depend only on d (and not on A). Namely, for d > 2, every > 0, every x ∈ St, and every choice of ∈ (0,1), we have \[ H (St B (x) ) ≤ ( 144d1- ) d-2. \] As a corollary, we obtain a density-type result, i.e. that the set St B (x) consists of at most \[ ( 144d1- ) d-1 \] line segments. In the plane (i.e., for d=2), it is possible to obtain tight structural results.