Multiple Gauss sums
Abstract
A multiple Gauss sum is a complete multiple exponential sum twisted by Dirichlet characters. We prove a new bound for multiple Gauss sums and, as an application, improve previous results in the Birch--Goldbach problem. Let F1, …, FR ∈ Z[x1, …, xs] be forms with differing degrees, with D being the highest degree, and let F = (F1, …, FR) be nonsingular. We prove that the system F(x)=0 is solvable in primes provided that s ≥ D2 4D+2 R5.
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