Sums of cubes and the Ratios Conjectures

Abstract

Works of Hooley and Heath-Brown imply a near-optimal bound on the number N of integral solutions to x13+…+x63 = 0 in expanding regions, conditional on automorphy and GRH for certain Hasse--Weil L-functions; for regions of diameter X 1, the bound takes the form N C() X3+ (>0). We attribute the to several subtly interacting proof factors; we then remove the assuming some standard number-theoretic hypotheses, mainly featuring the Ratios and Square-free Sieve Conjectures. In fact, our softest hypotheses imply conjectures of Hooley and Manin on N, and show that almost all integers a 4 9 are sums of three cubes. Our fullest hypotheses are capable of proving power-saving asymptotics for N, and producing almost all primes p 4 9.