λ-matchability in cubic graphs

Abstract

A vertex v of a 2-connected cubic graph G is λ-matchable if G has a spanning subgraph in which v has degree three whereas every other vertex has degree one, and we let λ(G) denote the number of such vertices. Clearly, λ=0 for bipartite graphs; ergo, we define λ-matchable pairs analogously, and we let ρ(G) denote the number of such pairs. We improve the constant lower bounds on both λ and ρ established recently by Chen, Lu and Zhang [Discrete Math., 2025] using matching-theoretic parameters arising from the seminal work of Lovász [J. Combin. Theory Ser. B, 1987], and we characterize all of the tight examples. We also solve the problem posed by Chen, Lu and Zhang: characterize 2-connected cubic graphs each of whose vertices is λ-matchable.