On diagonal digraphs, Koszul algebras and triangulations of homology spheres
Abstract
The article is devoted to the magnitude homology of digraphs, with a primary focus on diagonal digraphs, i.e., digraphs whose magnitude homology is concentrated on the diagonal. For any digraph G, we provide a complete description of the second magnitude homology MH2,k(G). This allows us to define a combinatorial condition, denoted by (V), which is equivalent to the vanishing of MH2,k(G, Z) for all k > . In particular, diagonal digraphs satisfy (V2). As a corollary, we obtain that the 2-dimensional CW-complex obtained from a diagonal undirected graph by attaching 2-cells to all squares and triangles of the graph is simply connected. We also give an interpretation of diagonality in terms of Koszul algebras: a digraph G is diagonal if and only if the distance algebra σ G is Koszul for any ground field, and if and only if G satisfies (V2) and the path cochain algebra (G) is Koszul for any ground field. To provide a source of examples of digraphs, we study the extended Hasse diagram GK of a pure simplicial complex K. For a triangulation K of a topological manifold M, we express the non-diagonal part of the magnitude homology of GK in terms of the homology of M. As a corollary, we obtain that if K is a triangulation of a closed manifold M, then GK is diagonal if and only if M is a homology sphere.
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