The k-path vertex cover: general bounds and chordal graphs
Abstract
For an integer k 3, a k-path vertex cover of a graph G=(V,E) is a set T⊂eq V that shares a vertex with every path subgraph of order k in G. The minimum cardinality of a k-path vertex cover is denoted by k(G). We give estimates -- mostly upper bounds -- on k(G) in terms of various parameters, including vertex degrees and the number of vertices and edges. The problem is also considered on chordal graphs and planar graphs.
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