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In this paper, we introduce a density-sensitive bifiltration on Dowker complexes. Previously, Dowker complexes were studied to address directional or bivariate data whereas density-sensitive bifiltrations on Cech and Vietoris--Rips complexes were suggested to make them more robust. We combine these two lines of research, noting that the superlevels of the total weight function of a Dowker complex can be identified as an instance of Sheehy's multicover filtration. An application of the multicover nerve theorem then provides a form of Dowker duality that is compatible with this filtration. As a consequence, we find that the subdivision intrinsic Cech complex admits a smaller model. Moreover, regarding the total weight function as a counting measure, we generalize it to arbitrary measures and prove a density-sensitive stability theorem for the case of probability measures. Additionally, we provide an algorithm to calculate the appearances of simplices in our bifiltration and present computational examples.
Hellmer et al. (Fri,) studied this question.