Complete tripartite subgraphs of balanced tripartite graphs with large minimum degree

Abstract

In 1975 Bollob\'as, Erdos, and Szemer\'edi asked what minimum degree guarantees an octahedral subgraph K3(2) in any tripartite graph G with n vertices in each vertex class. We show that δ(G)≥ n+2n56 suffices thus improving the bound n+(1+o(1))n1112 of Bhalkikar and Zhao obtained by following their approach. Bollob\'as, Erdos, and Szemer\'edi conjectured that n+cn12 suffices and there are many K3(2)-free tripartite graphs G with δ(G)≥ n+cn12. We confirm this conjecture under the additional assumption that every vertex in G is adjacent to at least (1/5+)n vertices in any other vertex class.

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