Gallai's path decomposition conjecture for Cartesian product of graphs

Abstract

Let G be a graph of order n. A path decomposition P of G is a collection of edge-disjoint paths that covers all the edges of G. Let p(G) denote the minimum number of paths needed in a path decomposition of G. Gallai conjectured that if G is connected, then p(G)≤ n2. Let no(G) to denote the number of vertices with odd degree in G. Lov\'asz proved that if G is a connected graph with all vertices having degree odd, i.e. no(G)=n, then p(G)= n 2. In this paper, we prove that if G is a connected graph of order m≥ 2 with p(G)=no(G)2 and H is a connected graph of order n, then p(G H)≤mn2. Furthermore, we prove that p(G)=no(G)2, if one of the following is hold: (1) G is a tree; (2) G=Pn T, where n≥ 4 and T is a tree; (3) G=Pn H, where H is an even graph.

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