English

Geometric and spectral analysis on weighted digraphs

Combinatorics 2024-02-22 v2 Functional Analysis

Abstract

In this article we give a geometrical description of the (in general non-selfadjoint) in/out Laplacian L+/=(d+/)d\mathcal{L}^{+/-} = (d^{+/-})^* d and adjacency matrix on digraphs with arbitrary weights, where (d+/)(d^{+/-})^* is the adjoint of the evaluation map d+/d^{+/-} on the terminal/initial vertex of each arc and d=d++dd = d^+ + d^- denotes the discrete gradient. We prove that the multiplicity of the zero eigenvalue of L+/=(d+/)d\mathcal{L}^{+/-} = (d^{+/-})^* d coincides with the number of sources/sinks of the digraph. We also show that for an acyclic digraph with combinatorial weights the spectrum is contained in the set of non-zero integers. The geometrical perspective allows to interpret the set of circulations C\mathcal{C} of a weighted digraph as coclosed forms on the arcs, i.e. as the kernel of the discrete divergence dd^*. Moreover, C\mathcal{C} is perpendicular to the set of discrete gradients of functions on the vertices. We also give formulas to compute the capacity of a cut and the value of a flow in terms of L\mathcal{L}^- and dd. We illustrate the results with many concrete examples.

Keywords

Cite

@article{arxiv.2305.16773,
  title  = {Geometric and spectral analysis on weighted digraphs},
  author = {Fernando Lledó and Ignacio Sevillano},
  journal= {arXiv preprint arXiv:2305.16773},
  year   = {2024}
}

Comments

18 pages, 12 figures; abstract and introduction rewritten; 26 references added; minor corrections. Version accepted for publication in Linear Algebra and its Applications

R2 v1 2026-06-28T10:47:20.293Z