The sum-product conjecture is false for real numbers

Abstract

We disprove the sum-product conjecture for real numbers by constructing arbitrarily large A⊂ R (whose elements are algebraic integers in a number field of degree A) such that \[( A+A , AA)≤ A2-c\] where c>0 is an absolute constant. We also disprove the many sums and products conjecture by constructing, for any k≥ 3, arbitrarily large A⊂ R such that \[( kA, A(k))≤ AC k k\] 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.