Effective equidistribution, arithmetic purity of strong approximation, and geometric sieve for affine quadrics
Abstract
Let k be a number field. Let q(x1,·s,xn) be a non-degenerate integral quadratic form in n≥ 3 variables with coefficients in k and m∈ k×. Let X be the affine quadric defined by q=m in Ank. Based on results on effective equidistribution of S-integral points in symmetric spaces, we establish the following: (i) The arithmetic purity of strong approximation off any single place of k for X; (ii) The geometric sieve for p0-integral points on X when k=Q and p0 is a prime number.
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