Random Walks on Virtual Persistence Diagrams

Abstract

In the uniformly discrete case of virtual persistence diagram groups K(X,A), we construct a translation-invariant heat semigroup. The kernels are supported on a countable subgroup H, and the restriction to H has Fourier exponent λH satisfying λH(θ)=Σ∈ H\0\(1-θ())(), for a symmetric ∈1(H\0\). This gives a symmetric jump process on H. The exponent λH determines heat kernels, which define reproducing kernel Hilbert spaces and their associated semimetrics. Convex orders on the mixing measures give monotonicity for the kernels, Hilbert spaces, and semimetrics.

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