Isolation partitions in graphs
Abstract
Let G be a graph and k ≥ 3 an integer. A subset D ⊂eq V(G) is a k-clique (resp., cycle) isolating set of G if G-N[D] contains no k-clique (resp., cycle). In this paper, we prove that every connected graph with maximum degree at most k, except k-clique, can be partitioned into k+1 disjoint k-clique isolating sets, and that every connected claw-free subcubic graph, except 3-cycle, can be partitioned into four disjoint cycle isolating sets. As a consequence of the first result, every k-regular graph can be partitioned into k+1 disjoint k-clique isolating sets.
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