Strong Approximation and Hasse Principle for Integral Quadratic Forms over Affine Curves
Abstract
We extend some parts of the representation theory for integral quadratic forms over the ring of integers of a number field to the case over the coordinate ring k[C] of an affine curve C over a general base field k. By using the genus theory, we link the strong approximation property of certain spin groups to the Hasse principle for representations of integral quadratic forms over k[C] and derive several applications. In particular, we give an example where a spin group does not satisfy strong approximation.
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