Diagonal cubic forms and the large sieve

Abstract

Let N(X) be the number of integral zeros (x1,…,x6)∈ [-X,X]6 of Σ1 i 6 xi3. Works of Hooley and Heath-Brown imply N(X)ε X3+ε, if one assumes automorphy and GRH for certain Hasse--Weil L-functions. Assuming instead a natural large sieve inequality, we recover the same bound on N(X). This is part of a more general statement, for diagonal cubic forms in ≥ 4 variables, where we allow approximations to Hasse--Weil L-functions.