The existence of a path-factor without small odd paths
Abstract
In this paper, we show that if a graph G satisfies c1(G-X)+23c3(G-X)≤ 43|X|+13 for all X⊂eq V(G), then G has a \P2,P5\-factor, where ci(G-X) is the number of components C of G-X with |V(C)|=i.
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