English

Counting Arithmetical Structures on Paths and Cycles

Combinatorics 2022-01-25 v4 Number Theory

Abstract

Let GG be a finite, simple, connected graph. An arithmetical structure on GG is a pair of positive integer vectors d,r\mathbf{d},\mathbf{r} such that (diag(d)A)r=0(\mathrm{diag}(\mathbf{d})-A)\mathbf{r}=0, where AA is the adjacency matrix of GG. We investigate the combinatorics of arithmetical structures on path and cycle graphs, as well as the associated critical groups (the cokernels of the matrices (diag(d)A)(\mathrm{diag}(\mathbf{d})-A)). For paths, we prove that arithmetical structures are enumerated by the Catalan numbers, and we obtain refined enumeration results related to ballot sequences. For cycles, we prove that arithmetical structures are enumerated by the binomial coefficients (2n1n1)\binom{2n-1}{n-1}, and we obtain refined enumeration results related to multisets. In addition, we determine the critical groups for all arithmetical structures on paths and cycles.

Keywords

Cite

@article{arxiv.1701.06377,
  title  = {Counting Arithmetical Structures on Paths and Cycles},
  author = {Benjamin Braun and Hugo Corrales and Scott Corry and Luis David García Puente and Darren Glass and Nathan Kaplan and Jeremy L. Martin and Gregg Musiker and Carlos E. Valencia},
  journal= {arXiv preprint arXiv:1701.06377},
  year   = {2022}
}
R2 v1 2026-06-22T17:57:05.348Z