Mader's Conjecture and Its Variants for Cographs
Abstract
The class of cographs is one of the most well-known graph classes, which is also known to be equivalent to the class of P4-free graphs. We show that Mader's conjecture is true if we restrict ourselves to cographs, that is, for any tree T of order m, every k-connected cograph G with δ(G) ≥ 3k2 +m-1 contains a subtree T' T such that G-V(T') is still k-connected, where δ(G) denotes the minimum degree of G. Moreover, we show that three variants of Mader's conjecture hold for cographs, that is, for any tree T of order m, every k-connected (respectively, k-edge-connected) cograph G with δ(G) ≥ k+m-1 contains a subtree T' T such that G-E(T') is k-connected (respectively, k-edge-connected), every k-edge-connected cograph G with δ(G) ≥ k+m-[k = 1] contains a subtree T' T such that G-V(T') is k-edge-connected, where we use Iverson's convention for [k = 1]. We furthermore present tight lower bounds on the minimum degree of a cograph for the existence of disjoint connectivity keeping trees, a maximal connectedness keeping tree and a super edge-connectedness keeping tree.
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