Random Cech complexes on Rd: decrackling the noise with local scalings

Abstract

We investigate the homology of an unbounded noisy sample on Rd, under various assumptions on the sampling density. This investigation is based on previous results by Adler, Bobrowski, and Weinberger (crackle), and Owada and Adler (topoCrackle). There, it was found that unbounded noise generally introduces non-vanishing homology, a phenomenon called topological crackle, unless the density has superexponential decay on Rd. We show how some well-chosen non-trivial variable bandwidth constructions can extend the class of densities where crackle doesn't occur to any light tail density with mild assumptions, what we call decrackling the noise.