On a Hybrid Version of the Vinogradov Mean Value Theorem

Abstract

Given a family = (1, …, d)∈ Z[T]d of d distinct nonconstant polynomials, a positive integer k d and a real positive parameter , we consider the mean value Mk, (, N) = ∫x ∈ [0,1]k y ∈ [0,1]d-k | S(x, y; N) | dx of exponential sums S( x, y; N) = Σn=1N (2 π i (Σj=1k xj j(n)+ Σj=1d-kyjk+j(n))), where x = (x1, …, xk) and y =(y1, …, yd-k). The case of polynomials i(T) = Ti, i =1, …, d and k=d corresponds to the classical Vinaogradov mean value theorem. Here motivated by recent works of Wooley (2015) and the authors (2019) on bounds on y ∈ [0,1]d-k | S( x, y; N) | for almost all x ∈ [0,1]k, we obtain nontrivial bounds on Mk, (, N).