Counting integer points on quadrics with arithmetic weights

Abstract

Let F ∈ Z[x] be a diagonal, non-singular quadratic form in 4 variables. Let λ(n) be the normalised Fourier coefficients of a holomorphic Hecke form of full level. We give an upper bound for the problem of counting integer zeros of F with |x| ≤ X, weighted by λ(x1).