Separating the edges of a graph by a linear number of paths
Abstract
Recently, Letzter proved that any graph of order n contains a collection P of O(n n) paths with the following property: for all distinct edges e and f there exists a path in P which contains e but not f. We improve this upper bound to 19 n, thus answering a question of G.O.H. Katona and confirming a conjecture independently posed by Balogh, Csaba, Martin, and Pluh\'ar and by Falgas-Ravry, Kittipassorn, Kor\'andi, Letzter, and Narayanan. Our proof is elementary and self-contained.
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