A Quantitative Hasse Principle for Weighted Quartic Forms
Abstract
We derive, via the Hardy-Littlewood method, an asymptotic formula for the number of integral zeros of a particular class of weighted quartic forms under the assumption of non-singular local solubility. Our polynomials F( x, y) ∈ Z[x1,…,xs1,y1,…,ys2] satisfy the condition that F(λ2 x, λ y) = λ4 F( x, y). Our conclusions improve on those that would follow from a direct application of the methods of Birch. For example, we show that in many circumstances the expected asymptotic formula holds when s1 2 and 2s1 + s2 > 8.
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