Mayer Path Homology

Abstract

We introduce Mayer path homology, a new homology theory for directed path complexes obtained by equipping path complexes with an N-nilpotent differential. The main novelty of this work is the introduction of an N-differential on path complexes, giving rise to N-chain complexes of ∂-invariant paths and Mayer path homology groups HnN,q(P). We prove that this construction defines a canonical invariant of directed graphs and is more sensitive than standard path homology, distinguishing directed network motifs that ordinary path homology cannot separate. We further establish a complete classification of generators of Ω2N and Ω3N, determining all admissible combinatorial types. Finally, we characterize elements of the first Mayer path cycles group Z1N,q in terms of weighted directed cycles arising from spanning-tree constructions. These results provide the first systematic structural theory for Mayer path complexes and reveal new higher-order algebraic structures in directed graphs.