On the rational Tur\'an exponents conjecture

Abstract

The extremal number ex(n,F) of a graph F is the maximum number of edges in an n-vertex graph not containing F as a subgraph. A real number r ∈ [1,2] is realisable if there exists a graph F with ex(n , F) = (nr). Several decades ago, Erdos and Simonovits conjectured that every rational number in [1,2] is realisable. Despite decades of effort, the only known realisable numbers are 0,1, 75, 2, and the numbers of the form 1+1m, 2-1m, 2-2m for integers m ≥ 1. In particular, it is not even known whether the set of all realisable numbers contains a single limit point other than two numbers 1 and 2. In this paper, we make progress on the conjecture of Erdos and Simonovits. First, we show that 2 - ab is realisable for any integers a,b ≥ 1 with b>a and b 1 ~( mod\:a). This includes all previously known ones, and gives infinitely many limit points 2-1m in the set of all realisable numbers as a consequence. Secondly, we propose a conjecture on subdivisions of bipartite graphs. Apart from being interesting on its own, we show that, somewhat surprisingly, this subdivision conjecture in fact implies that every rational number between 1 and 2 is realisable.