English

On strongly walk regular graphs, triple sum sets and their codes

Combinatorics 2025-10-02 v3

Abstract

Strongly walk regular graphs (SWRGs or ss-SWRGs) form a natural generalization of strongly regular graphs (SRGs) where paths of length~2 are replaced by paths of length~ss. They can be constructed as coset graphs of the duals of projective three-weight codes whose weights satisfy a certain equation. We provide classifications of the feasible parameters of these codes in the binary and ternary case for medium size code lengths. For the binary case, the divisibility of the weights of these codes is investigated and several general results are shown. It is known that an ss-SWRG has at most 4 distinct eigenvalues k>θ1>θ2>θ3k > \theta_1 > \theta_2 > \theta_3, and that the triple (θ1,θ2,θ3)(\theta_1, \theta_2, \theta_3) satisfies a certain homogeneous polynomial equation of degree s2s - 2 (Van Dam, Omidi, 2013). This equation defines a plane algebraic curve; we use methods from algorithmic arithmetic geometry to show that for s=5s = 5 and s=7s = 7, there are only the obvious solutions, and we conjecture this to remain true for all (odd) s9s \ge 9.

Keywords

Cite

@article{arxiv.2012.06160,
  title  = {On strongly walk regular graphs, triple sum sets and their codes},
  author = {Michael Kiermaier and Sascha Kurz and Patrick Solé and Michael Stoll and Alfred Wassermann},
  journal= {arXiv preprint arXiv:2012.06160},
  year   = {2025}
}

Comments

42 pages

R2 v1 2026-06-23T20:53:40.259Z