On elementary equivalence, isomorphism and isogeny of arithmetic function fields

Details On elementary equivalence, isomorphism and isogeny of arithmetic function fields On elementary equivalence, isomorphism and isogeny of arithmetic function fields

2004-06-08

arxiv.org/abs/math/0406133v1

Mathematics

Logic

23 pages

Scientific paper

Motivated by recent work of Florian Pop, we study the connections between three notions of equivalence of function fields: isomorphism, elementary equivalence, and the condition that each of a pair of fields can be embedded in the other, which we call isogeny. Some of our results are purely geometric: we give an isogeny classification of Severi-Brauer varieties and of quadric surfaces. These results are applied to deduce new instances of "elementary equivalence implies isomorphism": for all genus zero curves over a number field, and for certain genus one curves over a number field, including some which are not elliptic curves.

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