Degenerate Tur\'an densities of sparse hypergraphs II: a solution to the Brown-Erdos-S\'os problem for every uniformity

Abstract

For fixed integers r 3, e 3, and v r+1, let fr(n,v,e) denote the maximum number of edges in an n-vertex r-uniform hypergraph in which the union of arbitrary e distinct edges contains at least v+1 vertices. In 1973, Brown, Erdos and S\'os proved that fr(n,er-(e-1)k,e)=(nk) and conjectured that the limit n→∞f3(n,e+2,e)n2 always exists for all fixed integers e 3. In 2020 Shangguan and Tamo conjectured that the limit n→∞fr(n,er-(e-1)k,e)nk always exists for all fixed integers r>k 2 and e 3, which contains the BES conjecture as a special case for r=3, k=2. Recently, based on a result of Glock, Joos, Kim, K\"uhn, Lichev, and Pikhurko, Delcourt and Postle proved the BES conjecture. Extending their result, we show that the limit n→∞fr(n,er-2(e-1),e)n2 always exists, thereby proving the BES conjecture for every uniformity.