More sum-product type counterexamples: products with shifts and AA+A
Abstract
Adapting the construction disproving the sum-product conjecture over R present in Bloom, Sawin, Schildkraut and Zhelezov, we show the existence of a constant c>0 and arbitrarily large finite sets A ⊂eq R such that |AA+A+A| |A|2-c. As a corollary, all of the sets A+A, AA, (A+1)(A+1), A(A+1) and AA+A are of size O(|A|2-c) for this construction.
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