The set of Turán densities of (possibly infinite) families of r-graphs contains non-degenerate intervals for every r≥3.
The number $4/9$ is a non-jump for $3$-graphs
1 Pith paper cite this work. Polarity classification is still indexing.
abstract
We prove that $4/9$ is a non-jump for $3$-uniform hypergraphs. Our construction perturbs the $ABB$ pattern by inserting, inside the $B$-part, the union of a high-cogirth pair of Steiner triple systems. This goes below the barrier for non-jumps obtainable by Shaw's finite-pattern formulation of the Frankl--R\"odl method introduced in 1984. All results employing this approach use patterns where one of the parts has complete shadow. As the $ABB$ pattern is the smallest one with this property, the value $4/9$ is the natural barrier using this technique, and we conjecture that $4/9$ is the smallest non-jump for $3$-graphs. If our conjecture is true, this would answer (in a very strong form) an old question of Erd\Hos.
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math.CO 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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Intervals of hypergraph Tur\'an densities
The set of Turán densities of (possibly infinite) families of r-graphs contains non-degenerate intervals for every r≥3.