Subconvexity in the inhomogeneous cubic Vinogradov system
Abstract
When h∈ Z3, denote by B(X; h) the number of integral solutions to the system \[ Σi=16(xij-yij)=hj (1 j 3), \] with 1 xi,yi X (1 i 6). When h1 0 and appropriate local solubility conditions on h are met, we obtain an asymptotic formula for B(X; h), thereby establishing a subconvex local-global principle in the inhomogeneous cubic Vinogradov system. We obtain similar conclusions also when h1=0, h2 0 and X is sufficiently large in terms of h2. Our arguments involve minor arc estimates going beyond square-root cancellation.
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