Proves ex(n, K_{a,b}, K_{3,b+1}) = Θ_{a,b}(n^3) for odd b ≥ 5 and 3 < a ≤ b via a projective geometry construction over finite fields.
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2 Pith papers cite this work. Polarity classification is still indexing.
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Proves ex(n, K_{a,b}, K_{s,t}) = Theta(n^s) for s in {2,3} with s < a <= b and t large, plus existence of infinitely many r with ex(n, F, H) = Theta(n^r) for any edge-containing F.
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On the generalized Tur\'{a}n number of the complete bipartite graph $K_{3,b+1}$
Proves ex(n, K_{a,b}, K_{3,b+1}) = Θ_{a,b}(n^3) for odd b ≥ 5 and 3 < a ≤ b via a projective geometry construction over finite fields.
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On the generalized Tur\'an number of complete bipartite graphs
Proves ex(n, K_{a,b}, K_{s,t}) = Theta(n^s) for s in {2,3} with s < a <= b and t large, plus existence of infinitely many r with ex(n, F, H) = Theta(n^r) for any edge-containing F.