Nested homotopy models of finite metric spaces and their spectral homology

Abstract

For a real r≥ 0, we consider the notion of r-homotopy equivalence in the category quasimetric spaces, which includes metric spaces and directed graphs. We show that for a finite quasimetric space X there is a unique (up to isometry) r-homotopy equivalent quasimetric space of the minimal possible cardinality. It is called the r-minimal model of X. We use this to construct a decomposition of the magnitude-path spectral sequence of a digraph into a direct sum of spectral sequences with certain properties. We also construct an r-homotopy invariant SHrn,I(X) of a quasimetric space X, called spectral homology, that generalizes many other invariants: the pages of the magnitude-path spectral sequence, including path homology, magnitude homology, blurred magnitude homology and reachability homology.

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