Title: Triangle-free graphs with diameter 2 Show Chinese title

Title: 不含三角形的直径为2的图

Abstract: There are finitely many graphs with diameter $2$ and girth 5. What if the girth 5 assumption is relaxed? Apart from stars, are there finitely many triangle-free graphs with diameter $2$ and no $K_{2,3}$ subgraph? This question is related to the existence of triangle-free strongly regular graphs, but allowing for a range of co-degrees gives the question a more extremal flavour. More generally, for fixed $s$ and $t$, are there infinitely many twin-free triangle-free $K_{s,t}$-free graphs with diameter 2? This paper presents partial results regarding these questions, including computational results, potential Cayley-graph and probabilistic constructions. Show Chinese abstract

Abstract: 直径为$2$且围长为5的图是有限的。 如果放松围长为5的假设会怎样？ 除了星形图外，是否存在有限多个无三角形、直径为$2$且不含$K_{2,3}$子图的图？ 这个问题与无三角形强正则图的存在性有关，但允许不同的共度范围使问题更具极值性质。 更一般地，对于固定的$s$和$t$，是否存在无限多个无双生的无三角形$K_{s,t}$-自由图且直径为2？ 本文提出了关于这些问题的部分结果，包括计算结果、可能的Cayley图和概率构造。