Hypergraph Tur\'an densities can have arbitrarily large algebraic degree
Abstract
Grosu [On the algebraic and topological structure of the set of Tur\'an densities. J. Combin. Theory Ser. B 118 (2016) 137--185] asked if there exist an integer r 3 and a finite family of r-graphs whose Tur\'an density, as a real number, has (algebraic) degree greater than~r-1. In this note we show that, for all integers r 3 and d, there exists a finite family of r-graphs whose Tur\'an density has degree at least~d, thus answering Grosu's question in a strong form.
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