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The sum-product conjecture is false for real numbers

6 Pith papers cite this work. Polarity classification is still indexing.

6 Pith papers citing it
abstract

We disprove the sum-product conjecture for real numbers by constructing arbitrarily large $A\subset \mathbb{R}$ (whose elements are algebraic integers in a number field of degree $\asymp \log\lvert A\rvert$) such that \[\max(\lvert A+A\rvert ,\lvert AA\rvert)\leq \lvert A\rvert^{2-c}\] where $c>0$ is an absolute constant. We also disprove the many sums and products conjecture by constructing, for any $k\geq 3$, arbitrarily large $A\subset \mathbb{R}$ such that \[\max(\lvert kA\rvert,\lvert A^{(k)}\rvert)\leq \lvert A\rvert^{C\frac{\log k}{\log\log k}}\] for some constant $C>0$. We obtain similar constructions for $p$-adics, finite fields, and function fields in positive characteristic, and also obtain new lower bounds for the number of solutions to linear equations in a multiplicative group and the number of solutions to the unit equation in sufficiently many variables.

years

2026 6

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UNVERDICTED 6

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representative citing papers

Split primes and the Elekes-R\'onyai problem

math.NT · 2026-06-11 · unverdicted · novelty 8.0 · 2 refs

Constructs sets A subset R with |{x+y+(x-y)^2 : x,y in A}| <= |A|^{2-c} for some c>0, giving a counterexample to the Elekes-Rónyai problem via prime-splitting amplification.

Rectangles, triangles and Schr\"{o}dinger waves

math.CA · 2026-06-29 · unverdicted · novelty 7.0

Constructs lattice point sets with many rectangles and few isosceles triangles to produce explicit counterexamples to the Mizohata-Takeuchi conjecture for the paraboloid via transference principles.

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  • Rectangles, triangles and Schr\"{o}dinger waves math.CA · 2026-06-29 · unverdicted · none · ref 7 · internal anchor

    Constructs lattice point sets with many rectangles and few isosceles triangles to produce explicit counterexamples to the Mizohata-Takeuchi conjecture for the paraboloid via transference principles.