Quantitative strong approximation for ternary quadratic forms II

Abstract

Let F be a non-degenerate integral ternary quadratic form and let m0∈Z≠ 0. We study growth of rational points on the affine quadric (F=m0) and show that they are equidistributed in the adelic space off a finite place. This is closely related to Linnik's problem. Our approach is based on the δ-variant of the Hardy--Littlewood circle method developed by Heath-Brown.

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