English

2-switch-degree classification of split graphs

Combinatorics 2025-09-23 v2 Number Theory

Abstract

The 2-switch-degree of GG is the number of distinct 2-switches acting on a graph GG. In this work we study structural properties of the 2-switch-degree, with a focus on split graphs. Our approach is motivated by the Tyshkevich decomposition, which uniquely expresses any graph as a composition GrG1G_r \circ \ldots \circ G_1 of indecomposable graphs, where G2,,GrG_2, \ldots, G_r are split. Our key tool is the factor graph Φ(S)\Phi(S), a multigraph associated with a split graph SS that encodes 2-switch-degree information via edge multiplicities between independet vertices of SS. By leveraging Φ(S)\Phi(S), we reduce the problem of classifying indecomposable split graphs to enumerating and analyzing unlabeled connected multigraphs of fixed size. Using this method, we fully classify indecomposable split graphs of degrees 1, 2, 3, and 4. Further, we introduce and investigate the Δ\Delta-property, a surprising connection between Graph Theory and Number Theory that arises from nn-simple triangles (3-cycles with uniform edge multiplicity nn) of the factor graph.

Keywords

Cite

@article{arxiv.2507.13479,
  title  = {2-switch-degree classification of split graphs},
  author = {Victor Nicolas Schvöllner},
  journal= {arXiv preprint arXiv:2507.13479},
  year   = {2025}
}

Comments

PhD thesis, Universidad Nacional de San Luis (Argentina). English version of arXiv:2507.13479v1. This version includes corrections of typos and minor errors, and should be preferred over the previous Spanish submission arXiv:2507.13479v1

R2 v1 2026-07-01T04:06:53.696Z