中文

Mayer Path Homology

代数拓扑 2026-05-19 v1

摘要

We introduce Mayer path homology, a new homology theory for directed path complexes obtained by equipping path complexes with an NN-nilpotent differential. The main novelty of this work is the introduction of an NN-differential on path complexes, giving rise to NN-chain complexes of \partial-invariant paths and Mayer path homology groups HnN,q(P)H_n^{N,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\Omega_2^N and Ω3N\Omega_3^N, determining all admissible combinatorial types. Finally, we characterize elements of the first Mayer path cycles group Z1N,qZ_1^{N,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.

关键词

引用

@article{arxiv.2605.16525,
  title  = {Mayer Path Homology},
  author = {Dilan Karaguler and Guo-Wei Wei},
  journal= {arXiv preprint arXiv:2605.16525},
  year   = {2026}
}

备注

29 pages