Persistent Cost of Lipschitz Maps

Abstract

A 1-Lipschitz map between compact metric spaces f X Y induces a homomorphism of persistence modules on degree-d Vietoris--Rips persistent homology. We define the persistent cost of f from this induced homomorphism by quantifying the persistence carried by its kernel and cokernel modules. We prove that the persistent cost controls the interleaving distance between the degree-d Vietoris--Rips persistent homology modules of X and Y. Moreover, we obtain an explicit upper bound for the persistent cost in purely metric terms. Finally, we give a self-contained proof of the stability of the persistent cost introducing a Gromov-Hausdorff type distance for maps between compact metric spaces.

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