Magnitude homology and Path homology

Abstract

In this article, we show that magnitude homology and path homology are closely related, and we give some applications. We define differentials MHk(G) MH-1k-1(G) between magnitude homologies of a digraph G, which make them chain complexes. Then we show that its homology MHk(G) is non-trivial and homotopy invariant in the context of `homotopy theory of digraphs' developed by Grigor'yan--Muranov--S.-T. Yau et al (G-M-Ys in the following). It is remarkable that the diagonal part of our homology MHkk(G) is isomorphic to the reduced path homology Hk(G) also introduced by G-M-Ys. Further, we construct a spectral sequence whose first page is isomorphic to magnitude homology MHk(G), and the second page is isomorphic to our homology MHk(G). As an application, we show that the diagonality of magnitude homology implies triviality of reduced path homology. We also show that Hk(g) = 0 for k ≥ 2 and H1(g) ≠ 0 if any edges of an undirected graph g is contained in a cycle of length ≥ 5.