A Hall-type condition for path covers in bipartite graphs
Abstract
Let G be a bipartite graph with bipartition (X,Y). Inspired by a hypergraph problem, we seek an upper bound on the number of disjoint paths needed to cover all the vertices of X. We conjecture that a Hall-type sufficient condition holds based on the maximum value of |S|-|(S)|, where S⊂eq X and (S) is the set of all vertices in Y with at least two neighbors in S. This condition is also a necessary one for a hereditary version of the problem, where we delete vertices from X and try to cover the remaining vertices by disjoint paths. The conjecture holds when G is a forest, has maximum degree 3, or is regular with high girth, and we prove those results in this paper.
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