From Halin's Edge Removability to Matching Removability in k-Connected Graphs

Abstract

We study matching-removability under the degree/connectivity regime of Halin's theorem, which asserts that every k-connected graph G with minimum degree δ(G) k+1 contains an edge e such that G-e remains k-connected. For k, 1, an -matching is a matching of size . A matching M in a k-connected graph G is k-removable if G-M remains k-connected. We improve Halin's result by proving that every k-connected graph G with δ(G) k+1 contains a k-removable 2-matching, except when k=1 and G is a cycle. For small k we obtain stronger bounds: (i) k=1: a 1-removable \ n/2,δ(G)\-matching; (ii) k=2: a 2-removable (δ(G)+1)/2-matching, with a unique tight exception when δ(G) is even and G Kδ(G)+1; and (iii) k=3: for δ(G) 5, a 3-removable (δ(G)+1)/2-matching. All these bounds are optimal with respect to removable matching size and minimum degree. We also show that for every n 2δ, there exists a k-connected n-vertex graph G with minimum degree δ that does not contain a k-removable matching of size at least δ(G)+1. Moreover, for k 2 there exists a k-removable (δ(G)-c)-matching for some c 3, which is optimal up to the additive constant.