Galois cohomology in degree 3 of function fields of curves over number fields |
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| Authors: | V. Suresh |
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| Affiliation: | Department of Mathematics and Statistics, University of Hyderabad, GachiBowli, P.O. Central University, Hyderabad 500 046, India |
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| Abstract: | Let k be a field of characteristic not equal to 2. For n≥1, let  denote the nth Galois Cohomology group. The classical Tate's lemma asserts that if k is a number field then given finitely many elements  , there exist  such that αi=(a)∪(bi), where for any λ∈k∗, (λ) denotes the image of k∗ in  . In this paper we prove a higher dimensional analogue of the Tate's lemma. |
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| Keywords: | Galois cohomology Number fields Function fields of curves |
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