| Abstrakt: |
A spanning subgraph F of a graph G is called an even factor of G if each vertex of F has even degree at least 2 in F. It was conjectured that if a graph G has an even factor, then it has an even factor F with $$|E(F)|\ge {4\over 7}(|E(G)| + 1)+ {2\over 7}|V_2(G)|$$ , where $$V_2(G)$$ is the set of vertices of degree 2 in G. We note that the conjecture is false if G is a triangle. In this paper, we confirm the conjecture for all graphs on at least 4 vertices, and moreover, we prove that if $$|E(H)|\le {4\over 7}(|E(G)| + 1)+ {2\over 7}|V_2(G)|$$ for every even factor H of G, then every maximum even factor of G is a 2-factor consisting of even circuits. [ABSTRACT FROM AUTHOR] |
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