Avoiding long Berge cycles

“…The remaining case of t = k + 1 was settled by Davoodi, Győri, Methuku and Tompkins [5]. For long cycles, Füredi, Kostochka and Luo [7] showed that for k ≥ 3 and t [6]. The case when t = k is recently settled by Győri et al [13].…”

On the cover Ramsey number of Berge hypergraphs

“…The remaining case of t = k + 1 was settled by Davoodi, Győri, Methuku and Tompkins [5]. For long cycles, Füredi, Kostochka and Luo [7] showed that for k ≥ 3 and t [6]. The case when t = k is recently settled by Győri et al [13].…”

On the cover Ramsey number of Berge hypergraphs

“…Both papers [9,4] conjectured the maximum number of edges to be bounded by max (n−1)(r−1) r , n − (r − 1) (See Figure 1). Theorem 5 (Füredi, Kostochka and Luo [5,6]). Let r ≥ 3 and k ≥ r + 3, and suppose H is an n-vertex r-graph with no Berge cycle of length k or longer.…”

“…Similarly the extremal hypergraphs when Berge cycles of length at least k are forbidden, are different in the cases when k ≥ r + 2 and k ≤ r + 1 with an exceptional third case when k = r. The latter has a surprisingly different extremal hypergraph. Fűredi, Kostochka and Luo [5] provide sharp bounds and extremal constructions for infinitely many n, for k ≥ r+3 ≥ 6. Later they [6] also determined exact bounds and extremal constructions for all n, for the case k ≥ r+4.…”

The Structure of Hypergraphs without long Berge cycles

“…These bounds were improved by Füredi and Özkahya [9], Jiang and Ma [19], Gerbner, Methuku and Vizer [11]. Recently Füredi, Kostochka and Luo [7] started the study of the maximum size of an n-vertex r-uniform hypergraph without any Berge cycle of length at least k. This study has been continued in [8,18,20,4].…”

$3$-uniform hypergraphs without a cycle of length five