English

EKR-Type Theorems for Pendant Graph Constructions

Combinatorics 2025-10-28 v1

Abstract

The classical Erd\H{o}s--Ko--Rado (EKR) theorem characterizes the maximum size of intersecting families of rr-element subsets of an nn-element set. We study EKR-type questions for independent rr-sets in \emph{pendant} graph constructions, obtained by attaching to each base vertex a clique of prescribed size. Our contributions are threefold. We give an alternate and purely combinatorial proof (via shifting and shadows) that the pendant complete graph KnK_n^{*} is rr-EKR for n2rn \ge 2r, and strictly so for n>2rn>2r, recovering a result of De Silva, Dionne, Dunkelberg, and Harris. We extend this to \emph{generalized pendant complete graphs}, where every base vertex in the clique supports a clique of arbitrary size, proving that that generalized pendant complete graphs are rr-EKR whenever n2rn \ge 2r. For pendant paths PnP_n^{*}, we provide elementary constructions showing that PnP_n^{*} is not (nk)(n-k)-EKR when n3k+2n \ge 3k+2 for k2k\ge 2, not (n1)(n-1)-EKR for n6n\ge 6, and not nn-EKR for n4n\ge 4. These results fit naturally into the Holroyd--Talbot perspective relating rr-EKR thresholds to independence parameters and supply tools for further pendant constructions.

Keywords

Cite

@article{arxiv.2510.22103,
  title  = {EKR-Type Theorems for Pendant Graph Constructions},
  author = {Michael Carrion and Melissa M. Fuentes and Zaphenath Joseph and Alexander Nappo},
  journal= {arXiv preprint arXiv:2510.22103},
  year   = {2025}
}

Comments

8 pages

R2 v1 2026-07-01T07:05:10.912Z