Quantitative strong approximation for ternary quadratic forms I

Abstract

We derive asymptotic formulas with a secondary term for the (smoothly weighted) count of number of integer solutions of height ≤slant B with local conditions to the equation F(x1,x2,x3)=m, where F is a non-degenerate indefinite ternary integral quadratic form, and m is a non-zero integer satisfying -mF= which can grow like O(B2-θ) for some fixed θ>0. Our approach is based on the δ-variant of the Hardy--Littlewood circle method developed by Heath-Brown.

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