报告摘要:
| In this talk, it is shown that if G = (V1; V2;E) is a bipartite graph such that d(vi)≥|V3-i|/3 + 4 for all vi∈Vi, where i = 1, 2, then G is a weakly bipancyclic graph of girth 4. This improves a theorem of Tian and Zang [7], which asserts that if G is a Hamilton bipartite graph on 2n (n≥60) vertices with minimum degree greater than 2n/5+2, then G is bipancyclic. By combining our result with a theorem of Jackson and Li [6], we obtain that every 2-connected k-regular bipartite graph on at most 6k-38 vertices is bipancyclic.
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