Alexander Duality for Functions: the Persistent Behavior of Land and Water and Shore
Abstract
This note contributes to the point calculus of persistent homology by extending Alexander duality to real-valued functions. Given a perfect Morse function f: Sn+1 [0,1] and a decomposition Sn+1 = U V such that M = V is an n-manifold, we prove elementary relationships between the persistence diagrams of f restricted to U, to V, and to M.
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