Parallel decomposition of persistence modules through interval bases

We introduce an algorithm to decompose any finite-type persistence module with coefficients in a field into what we call an {\em interval basis}. This construction yields both the standard persistence pairs of Topological Data Analysis (TDA), as well as a special set of generators inducing the interval decomposition of the Structure theorem. The computation of this basis can be distributed over the steps in the persistence module. This construction works for general persistence modules on a field $\mathbb{F}$, not necessarily deriving from persistent homology. We subsequently provide a parallel algorithm to build a persistent homology module over $\mathbb{R}$ by leveraging the Hodge decomposition, thus providing new motivation to explore the interplay between TDA and the Hodge Laplacian.