Tur\'an numbers for Ks,t-free graphs: topological obstructions and algebraic constructions
Abstract
We show that every hypersurface in s× s contains a large grid, i.e., the set of the form S× T, with S,T⊂ s. We use this to deduce that the known constructions of extremal K2,2-free and K3,3-free graphs cannot be generalized to a similar construction of Ks,s-free graphs for any s≥ 4. We also give new constructions of extremal Ks,t-free graphs for large t.
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