On the Singular Set of Free Interface in an Optimal Partition Problem

Abstract: We study the singular set of free interface in an optimal partition problem for the Dirichlet eigenvalues. We prove that its upper (n − 2)‐dimensional Minkowski content, and consequently its (n − 2)‐dimensional Hausdorff measure, are locally finite. We also show that the singular set is countably (n − 2)‐rectifiable; namely, it can be covered by countably many C1‐manifolds of dimension (n − 2), up to a set of (n − 2)‐dimensional Hausdorff measure zero. Our results hold for optimal partitions on Riemannian mani… Show more

“…Because the support of µ x is on B 1 (x) \ B 1/2 (x), and since x is on the line segment between x 1 and x 2 , we have that |x − x ℓ | ≤ 1 4 for ℓ = 1, 2 and we see that…”

“…Otherwise, we include them in B(1) (and we will repeat the refining process shortly). We define C(1) = G(1) ∪ B (1). Observe that Thus, if we choose ρ to be smaller than ρ 0 (m) := 1 2C(m) , which is a purely dimensional constant, we can guarantee that C(m)ρ ≤ 1 2 .…”

“…Proof. First, without loss of generality we may assume that τ = 1 8 and x = 0. Although this may increase I φ (0, 64), it will still be bounded in terms of Λ by Lemma 4.2.…”

“…[9,10]. The paper of Naber and Valtorta provides a framework which de Lellis, Marchese, Spadaro, and Valtorta's have used to study Q-valued functions in [8], and which Alper has used in [1] to study an optimal 2020 Mathematics Subject Classification. Primary 58E20, Secondary 49N60.…”

“…partition problem. We draw special attention to this work of Alper, [1], because it shows that the singular sets of harmonic maps into one-dimensional buildings are (m − 2)-rectifiable. In this paper, we adapt the framework of Naber-Valtorta to our special case, closely following the arguments of [8].…”

Rectifiability of the Singular Set of Harmonic Maps into Buildings

“…Because the support of µ x is on B 1 (x) \ B 1/2 (x), and since x is on the line segment between x 1 and x 2 , we have that |x − x ℓ | ≤ 1 4 for ℓ = 1, 2 and we see that…”

“…Otherwise, we include them in B(1) (and we will repeat the refining process shortly). We define C(1) = G(1) ∪ B (1). Observe that Thus, if we choose ρ to be smaller than ρ 0 (m) := 1 2C(m) , which is a purely dimensional constant, we can guarantee that C(m)ρ ≤ 1 2 .…”

“…Proof. First, without loss of generality we may assume that τ = 1 8 and x = 0. Although this may increase I φ (0, 64), it will still be bounded in terms of Λ by Lemma 4.2.…”

“…[9,10]. The paper of Naber and Valtorta provides a framework which de Lellis, Marchese, Spadaro, and Valtorta's have used to study Q-valued functions in [8], and which Alper has used in [1] to study an optimal 2020 Mathematics Subject Classification. Primary 58E20, Secondary 49N60.…”

“…partition problem. We draw special attention to this work of Alper, [1], because it shows that the singular sets of harmonic maps into one-dimensional buildings are (m − 2)-rectifiable. In this paper, we adapt the framework of Naber-Valtorta to our special case, closely following the arguments of [8].…”

Rectifiability of the Singular Set of Harmonic Maps into Buildings

Free boundary problems with long-range interactions: uniform Lipschitz estimates in the radius

Large m asymptotics for minimal partitions of the Dirichlet eigenvalue