Publications in Math-Net.Ru
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On the size of the set $AA+A$
J. London Math. Soc., 99:2 (2019), 477–494
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If $A+A$ is small then $AAA$ is superquadratic
J. Number Theory, 201 (2019), 124–134
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New results on sum-product type growth over fields
Mathematika, 65:3 (2019), 588–642
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Packing sets over finite abelian groups
Integers, 18 (2018), 38–9
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On discrete values of bilinear forms
Mat. Sb., 209:10 (2018), 71–88
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Variations on the sum-product problem II
SIAM J. Discrete Math., 31:3 (2017), 1878–1894
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New sum-product type estimates over finite fields
Adv. Math., 293 (2016), 589–605
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Variations on the sum-product problem
SIAM J. Discrete Math., 29:1 (2015), 514–540
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