Gallai's Path Decomposition of Levi Graph

Abstract

Gallai's path decomposition conjecture states that for a connected graph G on n vertices, there exists a path decomposition of size n2 . The Levi graph of order one, denoted by L1(m,k), is a bipartite graph with vertex partition (A,B), where A is the collection of all (k-1)-element subsets of [m], and B is the collection of all k-element subsets of [m]. In this graph, a (k-1)-element subset is adjacent to a k-element subset if and only if it is properly contained within the k-element subset. The path number of a graph G is the minimum size of its path decomposition. Gallai's conjecture can be seen as a conjecture on the upper bound of the path number of a connected graph. In this work, we prove the conjecture for L1(m,k) for all m 2 and 2 k m. Moreover, we determine the path number of L1(m,2) for all m.