The $k$-cover of a point cloud $X$ of $\mathbb{R}^{d}$ at radius $r$ is the set of all those points within distance $r$ of at least $k$ points of $X$. By varying the order $k$ and radius $r$ we obtain a two-parameter filtration known as the multicover bifiltration. This bifiltration has received attention recently due to being parameter-free and its robustness to outliers. However, it is hard to compute: the smallest known equivalent simplicial bifiltration has $O(|X|^{d+1})$ simplices, where $d$ is the dimension. In this paper we introduce a $(1+\epsilon)$-approximation of the multicover that has linear size $O(|X|)$, for a fixed $d$ and $\epsilon$. The methods also apply to the subdivision Rips bifiltration on metric spaces of bounded doubling dimension to obtain analogous results.
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