Reproducing Kernel Hilbert Spaces on Banach Completions of Virtual Persistence Diagram Groups

Abstract

Persistent homology maps a simplicial complex filtered by elements in R to finite formal sums of elements of R≤2 = \ (b,d) ∈ R2 \ ∞ \ b < d \ called (finite) persistence diagrams. This map is stable with respect to the p--Wasserstein distance for all p ∈ [1, + ∞ ]. Bubenik and Elchesen extend the free translation-invariant commutative Lipschitz monoid of finite persistence diagrams D(X,A) = D(X)/D(A) on arbitrary metric pairs (X,d,A) with A ⊂ X onto the free translation-invariant abelian Lipschitz group of virtual persistence diagrams K(X,A) = K(X)/K(A) as an isometric embedding D(X,A) K(X,A) via the Grothendieck group completion. They prove that the p-Wasserstein distance is translation invariant on D(X,A) if and only if p=1 and define the unique translation-invariant embedding of W1[d] into K(X,A) as . When K(X,A) is locally compact abelian, translation-invariant kernels can be constructed via positive-definite functions and Bochner's theorem on the Pontryagin dual. We prove that, for the metric topology induced by , the group (K(X,A),) is locally compact if and only if it is discrete, equivalently when the pointed metric space (X/A,d1,[A]) is uniformly discrete, and hence this approach fails outside that case. Assuming instead that (X/A,d1,[A]) is separable and not uniformly discrete, we develop a translation-invariant kernel theory for non--locally compact virtual persistence diagram groups. The group K(X,A) embeds isometrically into its canonical Banach-space linearization B= V(X,A) F(X/A,d1), and each bounded symmetric positive operator Q B B determines a translation-invariant Gaussian kernel k(x,y)=\!(-12\, Q(x-y),x-yB,B).