A note on highly connected $K_{2,\ell}$-minor free graphs

Nicolas Bousquet; Th\'eo Pierron; Alexandra Wesolek

arXiv:2301.02133·math.CO·March 18, 2024

A note on highly connected $K_{2,\ell}$-minor free graphs

Nicolas Bousquet, Th\'eo Pierron, Alexandra Wesolek

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Abstract

We show that every $3$ -connected $K_{2, ℓ}$ -minor free graph with minimum degree at least $4$ has maximum degree at most $7 ℓ$ . As a consequence, we show that every 3-connected $K_{2, ℓ}$ -minor free graph with minimum degree at least $5$ and no twins of degree $5$ has bounded size. Our proofs use Steiner trees and nested cuts; in particular, they do not rely on Ding's characterization of $K_{2, ℓ}$ -minor free graphs.

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TopicsAdvanced Graph Theory Research · Limits and Structures in Graph Theory · Graph theory and applications